3682 lines
113 KiB
Python
3682 lines
113 KiB
Python
"""Lite version of scipy.linalg.
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Notes
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-----
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This module is a lite version of the linalg.py module in SciPy which
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contains high-level Python interface to the LAPACK library. The lite
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version only accesses the following LAPACK functions: dgesv, zgesv,
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dgeev, zgeev, dgesdd, zgesdd, dgelsd, zgelsd, dsyevd, zheevd, dgetrf,
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zgetrf, dpotrf, zpotrf, dgeqrf, zgeqrf, zungqr, dorgqr.
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"""
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__all__ = ['matrix_power', 'solve', 'tensorsolve', 'tensorinv', 'inv',
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'cholesky', 'eigvals', 'eigvalsh', 'pinv', 'slogdet', 'det',
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'svd', 'svdvals', 'eig', 'eigh', 'lstsq', 'norm', 'qr', 'cond',
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'matrix_rank', 'LinAlgError', 'multi_dot', 'trace', 'diagonal',
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'cross', 'outer', 'tensordot', 'matmul', 'matrix_transpose',
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'matrix_norm', 'vector_norm', 'vecdot']
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import functools
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import operator
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import warnings
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from typing import NamedTuple, Any
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from numpy._utils import set_module
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from numpy._core import (
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array, asarray, zeros, empty, empty_like, intc, single, double,
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csingle, cdouble, inexact, complexfloating, newaxis, all, inf, dot,
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add, multiply, sqrt, sum, isfinite, finfo, errstate, moveaxis, amin,
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amax, prod, abs, atleast_2d, intp, asanyarray, object_, matmul,
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swapaxes, divide, count_nonzero, isnan, sign, argsort, sort,
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reciprocal, overrides, diagonal as _core_diagonal, trace as _core_trace,
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cross as _core_cross, outer as _core_outer, tensordot as _core_tensordot,
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matmul as _core_matmul, matrix_transpose as _core_matrix_transpose,
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transpose as _core_transpose, vecdot as _core_vecdot,
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)
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from numpy._globals import _NoValue
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from numpy.lib._twodim_base_impl import triu, eye
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from numpy.lib.array_utils import normalize_axis_index, normalize_axis_tuple
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from numpy.linalg import _umath_linalg
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from numpy._typing import NDArray
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class EigResult(NamedTuple):
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eigenvalues: NDArray[Any]
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eigenvectors: NDArray[Any]
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class EighResult(NamedTuple):
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eigenvalues: NDArray[Any]
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eigenvectors: NDArray[Any]
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class QRResult(NamedTuple):
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Q: NDArray[Any]
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R: NDArray[Any]
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class SlogdetResult(NamedTuple):
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sign: NDArray[Any]
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logabsdet: NDArray[Any]
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class SVDResult(NamedTuple):
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U: NDArray[Any]
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S: NDArray[Any]
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Vh: NDArray[Any]
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array_function_dispatch = functools.partial(
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overrides.array_function_dispatch, module='numpy.linalg'
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)
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fortran_int = intc
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@set_module('numpy.linalg')
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class LinAlgError(ValueError):
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"""
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Generic Python-exception-derived object raised by linalg functions.
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General purpose exception class, derived from Python's ValueError
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class, programmatically raised in linalg functions when a Linear
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Algebra-related condition would prevent further correct execution of the
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function.
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Parameters
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----------
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None
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Examples
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--------
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>>> from numpy import linalg as LA
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>>> LA.inv(np.zeros((2,2)))
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Traceback (most recent call last):
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File "<stdin>", line 1, in <module>
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File "...linalg.py", line 350,
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in inv return wrap(solve(a, identity(a.shape[0], dtype=a.dtype)))
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File "...linalg.py", line 249,
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in solve
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raise LinAlgError('Singular matrix')
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numpy.linalg.LinAlgError: Singular matrix
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"""
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def _raise_linalgerror_singular(err, flag):
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raise LinAlgError("Singular matrix")
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def _raise_linalgerror_nonposdef(err, flag):
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raise LinAlgError("Matrix is not positive definite")
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def _raise_linalgerror_eigenvalues_nonconvergence(err, flag):
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raise LinAlgError("Eigenvalues did not converge")
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def _raise_linalgerror_svd_nonconvergence(err, flag):
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raise LinAlgError("SVD did not converge")
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def _raise_linalgerror_lstsq(err, flag):
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raise LinAlgError("SVD did not converge in Linear Least Squares")
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def _raise_linalgerror_qr(err, flag):
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raise LinAlgError("Incorrect argument found while performing "
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"QR factorization")
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def _makearray(a):
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new = asarray(a)
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wrap = getattr(a, "__array_wrap__", new.__array_wrap__)
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return new, wrap
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def isComplexType(t):
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return issubclass(t, complexfloating)
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_real_types_map = {single: single,
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double: double,
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csingle: single,
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cdouble: double}
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_complex_types_map = {single: csingle,
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double: cdouble,
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csingle: csingle,
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cdouble: cdouble}
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def _realType(t, default=double):
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return _real_types_map.get(t, default)
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def _complexType(t, default=cdouble):
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return _complex_types_map.get(t, default)
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def _commonType(*arrays):
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# in lite version, use higher precision (always double or cdouble)
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result_type = single
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is_complex = False
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for a in arrays:
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type_ = a.dtype.type
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if issubclass(type_, inexact):
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if isComplexType(type_):
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is_complex = True
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rt = _realType(type_, default=None)
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if rt is double:
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result_type = double
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elif rt is None:
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# unsupported inexact scalar
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raise TypeError("array type %s is unsupported in linalg" %
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(a.dtype.name,))
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else:
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result_type = double
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if is_complex:
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result_type = _complex_types_map[result_type]
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return cdouble, result_type
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else:
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return double, result_type
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def _to_native_byte_order(*arrays):
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ret = []
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for arr in arrays:
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if arr.dtype.byteorder not in ('=', '|'):
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ret.append(asarray(arr, dtype=arr.dtype.newbyteorder('=')))
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else:
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ret.append(arr)
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if len(ret) == 1:
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return ret[0]
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else:
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return ret
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def _assert_2d(*arrays):
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for a in arrays:
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if a.ndim != 2:
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raise LinAlgError('%d-dimensional array given. Array must be '
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'two-dimensional' % a.ndim)
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def _assert_stacked_2d(*arrays):
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for a in arrays:
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if a.ndim < 2:
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raise LinAlgError('%d-dimensional array given. Array must be '
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'at least two-dimensional' % a.ndim)
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def _assert_stacked_square(*arrays):
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for a in arrays:
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m, n = a.shape[-2:]
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if m != n:
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raise LinAlgError('Last 2 dimensions of the array must be square')
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def _assert_finite(*arrays):
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for a in arrays:
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if not isfinite(a).all():
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raise LinAlgError("Array must not contain infs or NaNs")
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def _is_empty_2d(arr):
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# check size first for efficiency
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return arr.size == 0 and prod(arr.shape[-2:]) == 0
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def transpose(a):
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"""
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Transpose each matrix in a stack of matrices.
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Unlike np.transpose, this only swaps the last two axes, rather than all of
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them
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Parameters
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----------
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a : (...,M,N) array_like
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Returns
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-------
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aT : (...,N,M) ndarray
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"""
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return swapaxes(a, -1, -2)
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# Linear equations
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def _tensorsolve_dispatcher(a, b, axes=None):
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return (a, b)
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@array_function_dispatch(_tensorsolve_dispatcher)
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def tensorsolve(a, b, axes=None):
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"""
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Solve the tensor equation ``a x = b`` for x.
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It is assumed that all indices of `x` are summed over in the product,
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together with the rightmost indices of `a`, as is done in, for example,
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``tensordot(a, x, axes=x.ndim)``.
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Parameters
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----------
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a : array_like
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Coefficient tensor, of shape ``b.shape + Q``. `Q`, a tuple, equals
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the shape of that sub-tensor of `a` consisting of the appropriate
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number of its rightmost indices, and must be such that
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``prod(Q) == prod(b.shape)`` (in which sense `a` is said to be
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'square').
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b : array_like
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Right-hand tensor, which can be of any shape.
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axes : tuple of ints, optional
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Axes in `a` to reorder to the right, before inversion.
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If None (default), no reordering is done.
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Returns
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-------
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x : ndarray, shape Q
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Raises
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------
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LinAlgError
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If `a` is singular or not 'square' (in the above sense).
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See Also
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--------
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numpy.tensordot, tensorinv, numpy.einsum
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Examples
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--------
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>>> import numpy as np
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>>> a = np.eye(2*3*4)
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>>> a.shape = (2*3, 4, 2, 3, 4)
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>>> rng = np.random.default_rng()
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>>> b = rng.normal(size=(2*3, 4))
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>>> x = np.linalg.tensorsolve(a, b)
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>>> x.shape
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(2, 3, 4)
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>>> np.allclose(np.tensordot(a, x, axes=3), b)
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True
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"""
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a, wrap = _makearray(a)
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b = asarray(b)
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an = a.ndim
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if axes is not None:
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allaxes = list(range(0, an))
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for k in axes:
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allaxes.remove(k)
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allaxes.insert(an, k)
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a = a.transpose(allaxes)
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oldshape = a.shape[-(an-b.ndim):]
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prod = 1
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for k in oldshape:
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prod *= k
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if a.size != prod ** 2:
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raise LinAlgError(
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"Input arrays must satisfy the requirement \
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prod(a.shape[b.ndim:]) == prod(a.shape[:b.ndim])"
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)
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a = a.reshape(prod, prod)
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b = b.ravel()
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res = wrap(solve(a, b))
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res.shape = oldshape
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return res
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def _solve_dispatcher(a, b):
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return (a, b)
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@array_function_dispatch(_solve_dispatcher)
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def solve(a, b):
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"""
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Solve a linear matrix equation, or system of linear scalar equations.
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Computes the "exact" solution, `x`, of the well-determined, i.e., full
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rank, linear matrix equation `ax = b`.
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Parameters
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----------
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a : (..., M, M) array_like
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Coefficient matrix.
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b : {(M,), (..., M, K)}, array_like
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Ordinate or "dependent variable" values.
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Returns
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-------
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x : {(..., M,), (..., M, K)} ndarray
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Solution to the system a x = b. Returned shape is (..., M) if b is
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shape (M,) and (..., M, K) if b is (..., M, K), where the "..." part is
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broadcasted between a and b.
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Raises
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------
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LinAlgError
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If `a` is singular or not square.
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See Also
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--------
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scipy.linalg.solve : Similar function in SciPy.
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Notes
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-----
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.. versionadded:: 1.8.0
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Broadcasting rules apply, see the `numpy.linalg` documentation for
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details.
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The solutions are computed using LAPACK routine ``_gesv``.
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`a` must be square and of full-rank, i.e., all rows (or, equivalently,
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columns) must be linearly independent; if either is not true, use
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`lstsq` for the least-squares best "solution" of the
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system/equation.
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.. versionchanged:: 2.0
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The b array is only treated as a shape (M,) column vector if it is
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exactly 1-dimensional. In all other instances it is treated as a stack
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of (M, K) matrices. Previously b would be treated as a stack of (M,)
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vectors if b.ndim was equal to a.ndim - 1.
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References
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----------
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.. [1] G. Strang, *Linear Algebra and Its Applications*, 2nd Ed., Orlando,
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FL, Academic Press, Inc., 1980, pg. 22.
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Examples
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--------
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Solve the system of equations:
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``x0 + 2 * x1 = 1`` and
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``3 * x0 + 5 * x1 = 2``:
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>>> import numpy as np
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>>> a = np.array([[1, 2], [3, 5]])
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>>> b = np.array([1, 2])
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>>> x = np.linalg.solve(a, b)
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>>> x
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array([-1., 1.])
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Check that the solution is correct:
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>>> np.allclose(np.dot(a, x), b)
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True
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"""
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a, _ = _makearray(a)
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_assert_stacked_2d(a)
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_assert_stacked_square(a)
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b, wrap = _makearray(b)
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t, result_t = _commonType(a, b)
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# We use the b = (..., M,) logic, only if the number of extra dimensions
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# match exactly
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if b.ndim == 1:
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gufunc = _umath_linalg.solve1
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else:
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gufunc = _umath_linalg.solve
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signature = 'DD->D' if isComplexType(t) else 'dd->d'
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with errstate(call=_raise_linalgerror_singular, invalid='call',
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over='ignore', divide='ignore', under='ignore'):
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r = gufunc(a, b, signature=signature)
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return wrap(r.astype(result_t, copy=False))
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def _tensorinv_dispatcher(a, ind=None):
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return (a,)
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@array_function_dispatch(_tensorinv_dispatcher)
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def tensorinv(a, ind=2):
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"""
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Compute the 'inverse' of an N-dimensional array.
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The result is an inverse for `a` relative to the tensordot operation
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``tensordot(a, b, ind)``, i. e., up to floating-point accuracy,
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``tensordot(tensorinv(a), a, ind)`` is the "identity" tensor for the
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tensordot operation.
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Parameters
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----------
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a : array_like
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Tensor to 'invert'. Its shape must be 'square', i. e.,
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``prod(a.shape[:ind]) == prod(a.shape[ind:])``.
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ind : int, optional
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Number of first indices that are involved in the inverse sum.
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Must be a positive integer, default is 2.
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Returns
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-------
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b : ndarray
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`a`'s tensordot inverse, shape ``a.shape[ind:] + a.shape[:ind]``.
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Raises
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------
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LinAlgError
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If `a` is singular or not 'square' (in the above sense).
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See Also
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--------
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numpy.tensordot, tensorsolve
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Examples
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--------
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>>> import numpy as np
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>>> a = np.eye(4*6)
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>>> a.shape = (4, 6, 8, 3)
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>>> ainv = np.linalg.tensorinv(a, ind=2)
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>>> ainv.shape
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(8, 3, 4, 6)
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>>> rng = np.random.default_rng()
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>>> b = rng.normal(size=(4, 6))
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>>> np.allclose(np.tensordot(ainv, b), np.linalg.tensorsolve(a, b))
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True
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>>> a = np.eye(4*6)
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>>> a.shape = (24, 8, 3)
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>>> ainv = np.linalg.tensorinv(a, ind=1)
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>>> ainv.shape
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(8, 3, 24)
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>>> rng = np.random.default_rng()
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>>> b = rng.normal(size=24)
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>>> np.allclose(np.tensordot(ainv, b, 1), np.linalg.tensorsolve(a, b))
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True
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"""
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a = asarray(a)
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oldshape = a.shape
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prod = 1
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if ind > 0:
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invshape = oldshape[ind:] + oldshape[:ind]
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for k in oldshape[ind:]:
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prod *= k
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else:
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raise ValueError("Invalid ind argument.")
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a = a.reshape(prod, -1)
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ia = inv(a)
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return ia.reshape(*invshape)
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# Matrix inversion
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def _unary_dispatcher(a):
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return (a,)
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@array_function_dispatch(_unary_dispatcher)
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def inv(a):
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"""
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Compute the inverse of a matrix.
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Given a square matrix `a`, return the matrix `ainv` satisfying
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``a @ ainv = ainv @ a = eye(a.shape[0])``.
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Parameters
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----------
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a : (..., M, M) array_like
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Matrix to be inverted.
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Returns
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-------
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ainv : (..., M, M) ndarray or matrix
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Inverse of the matrix `a`.
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Raises
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------
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LinAlgError
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If `a` is not square or inversion fails.
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See Also
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--------
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scipy.linalg.inv : Similar function in SciPy.
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numpy.linalg.cond : Compute the condition number of a matrix.
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numpy.linalg.svd : Compute the singular value decomposition of a matrix.
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Notes
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-----
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.. versionadded:: 1.8.0
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Broadcasting rules apply, see the `numpy.linalg` documentation for
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details.
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If `a` is detected to be singular, a `LinAlgError` is raised. If `a` is
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ill-conditioned, a `LinAlgError` may or may not be raised, and results may
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be inaccurate due to floating-point errors.
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|
|
References
|
|
----------
|
|
.. [1] Wikipedia, "Condition number",
|
|
https://en.wikipedia.org/wiki/Condition_number
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy.linalg import inv
|
|
>>> a = np.array([[1., 2.], [3., 4.]])
|
|
>>> ainv = inv(a)
|
|
>>> np.allclose(a @ ainv, np.eye(2))
|
|
True
|
|
>>> np.allclose(ainv @ a, np.eye(2))
|
|
True
|
|
|
|
If a is a matrix object, then the return value is a matrix as well:
|
|
|
|
>>> ainv = inv(np.matrix(a))
|
|
>>> ainv
|
|
matrix([[-2. , 1. ],
|
|
[ 1.5, -0.5]])
|
|
|
|
Inverses of several matrices can be computed at once:
|
|
|
|
>>> a = np.array([[[1., 2.], [3., 4.]], [[1, 3], [3, 5]]])
|
|
>>> inv(a)
|
|
array([[[-2. , 1. ],
|
|
[ 1.5 , -0.5 ]],
|
|
[[-1.25, 0.75],
|
|
[ 0.75, -0.25]]])
|
|
|
|
If a matrix is close to singular, the computed inverse may not satisfy
|
|
``a @ ainv = ainv @ a = eye(a.shape[0])`` even if a `LinAlgError`
|
|
is not raised:
|
|
|
|
>>> a = np.array([[2,4,6],[2,0,2],[6,8,14]])
|
|
>>> inv(a) # No errors raised
|
|
array([[-1.12589991e+15, -5.62949953e+14, 5.62949953e+14],
|
|
[-1.12589991e+15, -5.62949953e+14, 5.62949953e+14],
|
|
[ 1.12589991e+15, 5.62949953e+14, -5.62949953e+14]])
|
|
>>> a @ inv(a)
|
|
array([[ 0. , -0.5 , 0. ], # may vary
|
|
[-0.5 , 0.625, 0.25 ],
|
|
[ 0. , 0. , 1. ]])
|
|
|
|
To detect ill-conditioned matrices, you can use `numpy.linalg.cond` to
|
|
compute its *condition number* [1]_. The larger the condition number, the
|
|
more ill-conditioned the matrix is. As a rule of thumb, if the condition
|
|
number ``cond(a) = 10**k``, then you may lose up to ``k`` digits of
|
|
accuracy on top of what would be lost to the numerical method due to loss
|
|
of precision from arithmetic methods.
|
|
|
|
>>> from numpy.linalg import cond
|
|
>>> cond(a)
|
|
np.float64(8.659885634118668e+17) # may vary
|
|
|
|
It is also possible to detect ill-conditioning by inspecting the matrix's
|
|
singular values directly. The ratio between the largest and the smallest
|
|
singular value is the condition number:
|
|
|
|
>>> from numpy.linalg import svd
|
|
>>> sigma = svd(a, compute_uv=False) # Do not compute singular vectors
|
|
>>> sigma.max()/sigma.min()
|
|
8.659885634118668e+17 # may vary
|
|
|
|
"""
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
|
|
signature = 'D->D' if isComplexType(t) else 'd->d'
|
|
with errstate(call=_raise_linalgerror_singular, invalid='call',
|
|
over='ignore', divide='ignore', under='ignore'):
|
|
ainv = _umath_linalg.inv(a, signature=signature)
|
|
return wrap(ainv.astype(result_t, copy=False))
|
|
|
|
|
|
def _matrix_power_dispatcher(a, n):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_matrix_power_dispatcher)
|
|
def matrix_power(a, n):
|
|
"""
|
|
Raise a square matrix to the (integer) power `n`.
|
|
|
|
For positive integers `n`, the power is computed by repeated matrix
|
|
squarings and matrix multiplications. If ``n == 0``, the identity matrix
|
|
of the same shape as M is returned. If ``n < 0``, the inverse
|
|
is computed and then raised to the ``abs(n)``.
|
|
|
|
.. note:: Stacks of object matrices are not currently supported.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
Matrix to be "powered".
|
|
n : int
|
|
The exponent can be any integer or long integer, positive,
|
|
negative, or zero.
|
|
|
|
Returns
|
|
-------
|
|
a**n : (..., M, M) ndarray or matrix object
|
|
The return value is the same shape and type as `M`;
|
|
if the exponent is positive or zero then the type of the
|
|
elements is the same as those of `M`. If the exponent is
|
|
negative the elements are floating-point.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
For matrices that are not square or that (for negative powers) cannot
|
|
be inverted numerically.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy.linalg import matrix_power
|
|
>>> i = np.array([[0, 1], [-1, 0]]) # matrix equiv. of the imaginary unit
|
|
>>> matrix_power(i, 3) # should = -i
|
|
array([[ 0, -1],
|
|
[ 1, 0]])
|
|
>>> matrix_power(i, 0)
|
|
array([[1, 0],
|
|
[0, 1]])
|
|
>>> matrix_power(i, -3) # should = 1/(-i) = i, but w/ f.p. elements
|
|
array([[ 0., 1.],
|
|
[-1., 0.]])
|
|
|
|
Somewhat more sophisticated example
|
|
|
|
>>> q = np.zeros((4, 4))
|
|
>>> q[0:2, 0:2] = -i
|
|
>>> q[2:4, 2:4] = i
|
|
>>> q # one of the three quaternion units not equal to 1
|
|
array([[ 0., -1., 0., 0.],
|
|
[ 1., 0., 0., 0.],
|
|
[ 0., 0., 0., 1.],
|
|
[ 0., 0., -1., 0.]])
|
|
>>> matrix_power(q, 2) # = -np.eye(4)
|
|
array([[-1., 0., 0., 0.],
|
|
[ 0., -1., 0., 0.],
|
|
[ 0., 0., -1., 0.],
|
|
[ 0., 0., 0., -1.]])
|
|
|
|
"""
|
|
a = asanyarray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
|
|
try:
|
|
n = operator.index(n)
|
|
except TypeError as e:
|
|
raise TypeError("exponent must be an integer") from e
|
|
|
|
# Fall back on dot for object arrays. Object arrays are not supported by
|
|
# the current implementation of matmul using einsum
|
|
if a.dtype != object:
|
|
fmatmul = matmul
|
|
elif a.ndim == 2:
|
|
fmatmul = dot
|
|
else:
|
|
raise NotImplementedError(
|
|
"matrix_power not supported for stacks of object arrays")
|
|
|
|
if n == 0:
|
|
a = empty_like(a)
|
|
a[...] = eye(a.shape[-2], dtype=a.dtype)
|
|
return a
|
|
|
|
elif n < 0:
|
|
a = inv(a)
|
|
n = abs(n)
|
|
|
|
# short-cuts.
|
|
if n == 1:
|
|
return a
|
|
|
|
elif n == 2:
|
|
return fmatmul(a, a)
|
|
|
|
elif n == 3:
|
|
return fmatmul(fmatmul(a, a), a)
|
|
|
|
# Use binary decomposition to reduce the number of matrix multiplications.
|
|
# Here, we iterate over the bits of n, from LSB to MSB, raise `a` to
|
|
# increasing powers of 2, and multiply into the result as needed.
|
|
z = result = None
|
|
while n > 0:
|
|
z = a if z is None else fmatmul(z, z)
|
|
n, bit = divmod(n, 2)
|
|
if bit:
|
|
result = z if result is None else fmatmul(result, z)
|
|
|
|
return result
|
|
|
|
|
|
# Cholesky decomposition
|
|
|
|
def _cholesky_dispatcher(a, /, *, upper=None):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_cholesky_dispatcher)
|
|
def cholesky(a, /, *, upper=False):
|
|
"""
|
|
Cholesky decomposition.
|
|
|
|
Return the lower or upper Cholesky decomposition, ``L * L.H`` or
|
|
``U.H * U``, of the square matrix ``a``, where ``L`` is lower-triangular,
|
|
``U`` is upper-triangular, and ``.H`` is the conjugate transpose operator
|
|
(which is the ordinary transpose if ``a`` is real-valued). ``a`` must be
|
|
Hermitian (symmetric if real-valued) and positive-definite. No checking is
|
|
performed to verify whether ``a`` is Hermitian or not. In addition, only
|
|
the lower or upper-triangular and diagonal elements of ``a`` are used.
|
|
Only ``L`` or ``U`` is actually returned.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
Hermitian (symmetric if all elements are real), positive-definite
|
|
input matrix.
|
|
upper : bool
|
|
If ``True``, the result must be the upper-triangular Cholesky factor.
|
|
If ``False``, the result must be the lower-triangular Cholesky factor.
|
|
Default: ``False``.
|
|
|
|
Returns
|
|
-------
|
|
L : (..., M, M) array_like
|
|
Lower or upper-triangular Cholesky factor of `a`. Returns a matrix
|
|
object if `a` is a matrix object.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the decomposition fails, for example, if `a` is not
|
|
positive-definite.
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.cholesky : Similar function in SciPy.
|
|
scipy.linalg.cholesky_banded : Cholesky decompose a banded Hermitian
|
|
positive-definite matrix.
|
|
scipy.linalg.cho_factor : Cholesky decomposition of a matrix, to use in
|
|
`scipy.linalg.cho_solve`.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
The Cholesky decomposition is often used as a fast way of solving
|
|
|
|
.. math:: A \\mathbf{x} = \\mathbf{b}
|
|
|
|
(when `A` is both Hermitian/symmetric and positive-definite).
|
|
|
|
First, we solve for :math:`\\mathbf{y}` in
|
|
|
|
.. math:: L \\mathbf{y} = \\mathbf{b},
|
|
|
|
and then for :math:`\\mathbf{x}` in
|
|
|
|
.. math:: L^{H} \\mathbf{x} = \\mathbf{y}.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> A = np.array([[1,-2j],[2j,5]])
|
|
>>> A
|
|
array([[ 1.+0.j, -0.-2.j],
|
|
[ 0.+2.j, 5.+0.j]])
|
|
>>> L = np.linalg.cholesky(A)
|
|
>>> L
|
|
array([[1.+0.j, 0.+0.j],
|
|
[0.+2.j, 1.+0.j]])
|
|
>>> np.dot(L, L.T.conj()) # verify that L * L.H = A
|
|
array([[1.+0.j, 0.-2.j],
|
|
[0.+2.j, 5.+0.j]])
|
|
>>> A = [[1,-2j],[2j,5]] # what happens if A is only array_like?
|
|
>>> np.linalg.cholesky(A) # an ndarray object is returned
|
|
array([[1.+0.j, 0.+0.j],
|
|
[0.+2.j, 1.+0.j]])
|
|
>>> # But a matrix object is returned if A is a matrix object
|
|
>>> np.linalg.cholesky(np.matrix(A))
|
|
matrix([[ 1.+0.j, 0.+0.j],
|
|
[ 0.+2.j, 1.+0.j]])
|
|
>>> # The upper-triangular Cholesky factor can also be obtained.
|
|
>>> np.linalg.cholesky(A, upper=True)
|
|
array([[1.-0.j, 0.-2.j],
|
|
[0.-0.j, 1.-0.j]])
|
|
|
|
"""
|
|
gufunc = _umath_linalg.cholesky_up if upper else _umath_linalg.cholesky_lo
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
signature = 'D->D' if isComplexType(t) else 'd->d'
|
|
with errstate(call=_raise_linalgerror_nonposdef, invalid='call',
|
|
over='ignore', divide='ignore', under='ignore'):
|
|
r = gufunc(a, signature=signature)
|
|
return wrap(r.astype(result_t, copy=False))
|
|
|
|
|
|
# outer product
|
|
|
|
|
|
def _outer_dispatcher(x1, x2):
|
|
return (x1, x2)
|
|
|
|
|
|
@array_function_dispatch(_outer_dispatcher)
|
|
def outer(x1, x2, /):
|
|
"""
|
|
Compute the outer product of two vectors.
|
|
|
|
This function is Array API compatible. Compared to ``np.outer``
|
|
it accepts 1-dimensional inputs only.
|
|
|
|
Parameters
|
|
----------
|
|
x1 : (M,) array_like
|
|
One-dimensional input array of size ``N``.
|
|
Must have a numeric data type.
|
|
x2 : (N,) array_like
|
|
One-dimensional input array of size ``M``.
|
|
Must have a numeric data type.
|
|
|
|
Returns
|
|
-------
|
|
out : (M, N) ndarray
|
|
``out[i, j] = a[i] * b[j]``
|
|
|
|
See also
|
|
--------
|
|
outer
|
|
|
|
Examples
|
|
--------
|
|
Make a (*very* coarse) grid for computing a Mandelbrot set:
|
|
|
|
>>> rl = np.linalg.outer(np.ones((5,)), np.linspace(-2, 2, 5))
|
|
>>> rl
|
|
array([[-2., -1., 0., 1., 2.],
|
|
[-2., -1., 0., 1., 2.],
|
|
[-2., -1., 0., 1., 2.],
|
|
[-2., -1., 0., 1., 2.],
|
|
[-2., -1., 0., 1., 2.]])
|
|
>>> im = np.linalg.outer(1j*np.linspace(2, -2, 5), np.ones((5,)))
|
|
>>> im
|
|
array([[0.+2.j, 0.+2.j, 0.+2.j, 0.+2.j, 0.+2.j],
|
|
[0.+1.j, 0.+1.j, 0.+1.j, 0.+1.j, 0.+1.j],
|
|
[0.+0.j, 0.+0.j, 0.+0.j, 0.+0.j, 0.+0.j],
|
|
[0.-1.j, 0.-1.j, 0.-1.j, 0.-1.j, 0.-1.j],
|
|
[0.-2.j, 0.-2.j, 0.-2.j, 0.-2.j, 0.-2.j]])
|
|
>>> grid = rl + im
|
|
>>> grid
|
|
array([[-2.+2.j, -1.+2.j, 0.+2.j, 1.+2.j, 2.+2.j],
|
|
[-2.+1.j, -1.+1.j, 0.+1.j, 1.+1.j, 2.+1.j],
|
|
[-2.+0.j, -1.+0.j, 0.+0.j, 1.+0.j, 2.+0.j],
|
|
[-2.-1.j, -1.-1.j, 0.-1.j, 1.-1.j, 2.-1.j],
|
|
[-2.-2.j, -1.-2.j, 0.-2.j, 1.-2.j, 2.-2.j]])
|
|
|
|
An example using a "vector" of letters:
|
|
|
|
>>> x = np.array(['a', 'b', 'c'], dtype=object)
|
|
>>> np.linalg.outer(x, [1, 2, 3])
|
|
array([['a', 'aa', 'aaa'],
|
|
['b', 'bb', 'bbb'],
|
|
['c', 'cc', 'ccc']], dtype=object)
|
|
|
|
"""
|
|
x1 = asanyarray(x1)
|
|
x2 = asanyarray(x2)
|
|
if x1.ndim != 1 or x2.ndim != 1:
|
|
raise ValueError(
|
|
"Input arrays must be one-dimensional, but they are "
|
|
f"{x1.ndim=} and {x2.ndim=}."
|
|
)
|
|
return _core_outer(x1, x2, out=None)
|
|
|
|
|
|
# QR decomposition
|
|
|
|
|
|
def _qr_dispatcher(a, mode=None):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_qr_dispatcher)
|
|
def qr(a, mode='reduced'):
|
|
"""
|
|
Compute the qr factorization of a matrix.
|
|
|
|
Factor the matrix `a` as *qr*, where `q` is orthonormal and `r` is
|
|
upper-triangular.
|
|
|
|
Parameters
|
|
----------
|
|
a : array_like, shape (..., M, N)
|
|
An array-like object with the dimensionality of at least 2.
|
|
mode : {'reduced', 'complete', 'r', 'raw'}, optional, default: 'reduced'
|
|
If K = min(M, N), then
|
|
|
|
* 'reduced' : returns Q, R with dimensions (..., M, K), (..., K, N)
|
|
* 'complete' : returns Q, R with dimensions (..., M, M), (..., M, N)
|
|
* 'r' : returns R only with dimensions (..., K, N)
|
|
* 'raw' : returns h, tau with dimensions (..., N, M), (..., K,)
|
|
|
|
The options 'reduced', 'complete, and 'raw' are new in numpy 1.8,
|
|
see the notes for more information. The default is 'reduced', and to
|
|
maintain backward compatibility with earlier versions of numpy both
|
|
it and the old default 'full' can be omitted. Note that array h
|
|
returned in 'raw' mode is transposed for calling Fortran. The
|
|
'economic' mode is deprecated. The modes 'full' and 'economic' may
|
|
be passed using only the first letter for backwards compatibility,
|
|
but all others must be spelled out. See the Notes for more
|
|
explanation.
|
|
|
|
|
|
Returns
|
|
-------
|
|
When mode is 'reduced' or 'complete', the result will be a namedtuple with
|
|
the attributes `Q` and `R`.
|
|
|
|
Q : ndarray of float or complex, optional
|
|
A matrix with orthonormal columns. When mode = 'complete' the
|
|
result is an orthogonal/unitary matrix depending on whether or not
|
|
a is real/complex. The determinant may be either +/- 1 in that
|
|
case. In case the number of dimensions in the input array is
|
|
greater than 2 then a stack of the matrices with above properties
|
|
is returned.
|
|
R : ndarray of float or complex, optional
|
|
The upper-triangular matrix or a stack of upper-triangular
|
|
matrices if the number of dimensions in the input array is greater
|
|
than 2.
|
|
(h, tau) : ndarrays of np.double or np.cdouble, optional
|
|
The array h contains the Householder reflectors that generate q
|
|
along with r. The tau array contains scaling factors for the
|
|
reflectors. In the deprecated 'economic' mode only h is returned.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If factoring fails.
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.qr : Similar function in SciPy.
|
|
scipy.linalg.rq : Compute RQ decomposition of a matrix.
|
|
|
|
Notes
|
|
-----
|
|
This is an interface to the LAPACK routines ``dgeqrf``, ``zgeqrf``,
|
|
``dorgqr``, and ``zungqr``.
|
|
|
|
For more information on the qr factorization, see for example:
|
|
https://en.wikipedia.org/wiki/QR_factorization
|
|
|
|
Subclasses of `ndarray` are preserved except for the 'raw' mode. So if
|
|
`a` is of type `matrix`, all the return values will be matrices too.
|
|
|
|
New 'reduced', 'complete', and 'raw' options for mode were added in
|
|
NumPy 1.8.0 and the old option 'full' was made an alias of 'reduced'. In
|
|
addition the options 'full' and 'economic' were deprecated. Because
|
|
'full' was the previous default and 'reduced' is the new default,
|
|
backward compatibility can be maintained by letting `mode` default.
|
|
The 'raw' option was added so that LAPACK routines that can multiply
|
|
arrays by q using the Householder reflectors can be used. Note that in
|
|
this case the returned arrays are of type np.double or np.cdouble and
|
|
the h array is transposed to be FORTRAN compatible. No routines using
|
|
the 'raw' return are currently exposed by numpy, but some are available
|
|
in lapack_lite and just await the necessary work.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> rng = np.random.default_rng()
|
|
>>> a = rng.normal(size=(9, 6))
|
|
>>> Q, R = np.linalg.qr(a)
|
|
>>> np.allclose(a, np.dot(Q, R)) # a does equal QR
|
|
True
|
|
>>> R2 = np.linalg.qr(a, mode='r')
|
|
>>> np.allclose(R, R2) # mode='r' returns the same R as mode='full'
|
|
True
|
|
>>> a = np.random.normal(size=(3, 2, 2)) # Stack of 2 x 2 matrices as input
|
|
>>> Q, R = np.linalg.qr(a)
|
|
>>> Q.shape
|
|
(3, 2, 2)
|
|
>>> R.shape
|
|
(3, 2, 2)
|
|
>>> np.allclose(a, np.matmul(Q, R))
|
|
True
|
|
|
|
Example illustrating a common use of `qr`: solving of least squares
|
|
problems
|
|
|
|
What are the least-squares-best `m` and `y0` in ``y = y0 + mx`` for
|
|
the following data: {(0,1), (1,0), (1,2), (2,1)}. (Graph the points
|
|
and you'll see that it should be y0 = 0, m = 1.) The answer is provided
|
|
by solving the over-determined matrix equation ``Ax = b``, where::
|
|
|
|
A = array([[0, 1], [1, 1], [1, 1], [2, 1]])
|
|
x = array([[y0], [m]])
|
|
b = array([[1], [0], [2], [1]])
|
|
|
|
If A = QR such that Q is orthonormal (which is always possible via
|
|
Gram-Schmidt), then ``x = inv(R) * (Q.T) * b``. (In numpy practice,
|
|
however, we simply use `lstsq`.)
|
|
|
|
>>> A = np.array([[0, 1], [1, 1], [1, 1], [2, 1]])
|
|
>>> A
|
|
array([[0, 1],
|
|
[1, 1],
|
|
[1, 1],
|
|
[2, 1]])
|
|
>>> b = np.array([1, 2, 2, 3])
|
|
>>> Q, R = np.linalg.qr(A)
|
|
>>> p = np.dot(Q.T, b)
|
|
>>> np.dot(np.linalg.inv(R), p)
|
|
array([ 1., 1.])
|
|
|
|
"""
|
|
if mode not in ('reduced', 'complete', 'r', 'raw'):
|
|
if mode in ('f', 'full'):
|
|
# 2013-04-01, 1.8
|
|
msg = "".join((
|
|
"The 'full' option is deprecated in favor of 'reduced'.\n",
|
|
"For backward compatibility let mode default."))
|
|
warnings.warn(msg, DeprecationWarning, stacklevel=2)
|
|
mode = 'reduced'
|
|
elif mode in ('e', 'economic'):
|
|
# 2013-04-01, 1.8
|
|
msg = "The 'economic' option is deprecated."
|
|
warnings.warn(msg, DeprecationWarning, stacklevel=2)
|
|
mode = 'economic'
|
|
else:
|
|
raise ValueError(f"Unrecognized mode '{mode}'")
|
|
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
m, n = a.shape[-2:]
|
|
t, result_t = _commonType(a)
|
|
a = a.astype(t, copy=True)
|
|
a = _to_native_byte_order(a)
|
|
mn = min(m, n)
|
|
|
|
signature = 'D->D' if isComplexType(t) else 'd->d'
|
|
with errstate(call=_raise_linalgerror_qr, invalid='call',
|
|
over='ignore', divide='ignore', under='ignore'):
|
|
tau = _umath_linalg.qr_r_raw(a, signature=signature)
|
|
|
|
# handle modes that don't return q
|
|
if mode == 'r':
|
|
r = triu(a[..., :mn, :])
|
|
r = r.astype(result_t, copy=False)
|
|
return wrap(r)
|
|
|
|
if mode == 'raw':
|
|
q = transpose(a)
|
|
q = q.astype(result_t, copy=False)
|
|
tau = tau.astype(result_t, copy=False)
|
|
return wrap(q), tau
|
|
|
|
if mode == 'economic':
|
|
a = a.astype(result_t, copy=False)
|
|
return wrap(a)
|
|
|
|
# mc is the number of columns in the resulting q
|
|
# matrix. If the mode is complete then it is
|
|
# same as number of rows, and if the mode is reduced,
|
|
# then it is the minimum of number of rows and columns.
|
|
if mode == 'complete' and m > n:
|
|
mc = m
|
|
gufunc = _umath_linalg.qr_complete
|
|
else:
|
|
mc = mn
|
|
gufunc = _umath_linalg.qr_reduced
|
|
|
|
signature = 'DD->D' if isComplexType(t) else 'dd->d'
|
|
with errstate(call=_raise_linalgerror_qr, invalid='call',
|
|
over='ignore', divide='ignore', under='ignore'):
|
|
q = gufunc(a, tau, signature=signature)
|
|
r = triu(a[..., :mc, :])
|
|
|
|
q = q.astype(result_t, copy=False)
|
|
r = r.astype(result_t, copy=False)
|
|
|
|
return QRResult(wrap(q), wrap(r))
|
|
|
|
# Eigenvalues
|
|
|
|
|
|
@array_function_dispatch(_unary_dispatcher)
|
|
def eigvals(a):
|
|
"""
|
|
Compute the eigenvalues of a general matrix.
|
|
|
|
Main difference between `eigvals` and `eig`: the eigenvectors aren't
|
|
returned.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
A complex- or real-valued matrix whose eigenvalues will be computed.
|
|
|
|
Returns
|
|
-------
|
|
w : (..., M,) ndarray
|
|
The eigenvalues, each repeated according to its multiplicity.
|
|
They are not necessarily ordered, nor are they necessarily
|
|
real for real matrices.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the eigenvalue computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
eig : eigenvalues and right eigenvectors of general arrays
|
|
eigvalsh : eigenvalues of real symmetric or complex Hermitian
|
|
(conjugate symmetric) arrays.
|
|
eigh : eigenvalues and eigenvectors of real symmetric or complex
|
|
Hermitian (conjugate symmetric) arrays.
|
|
scipy.linalg.eigvals : Similar function in SciPy.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
This is implemented using the ``_geev`` LAPACK routines which compute
|
|
the eigenvalues and eigenvectors of general square arrays.
|
|
|
|
Examples
|
|
--------
|
|
Illustration, using the fact that the eigenvalues of a diagonal matrix
|
|
are its diagonal elements, that multiplying a matrix on the left
|
|
by an orthogonal matrix, `Q`, and on the right by `Q.T` (the transpose
|
|
of `Q`), preserves the eigenvalues of the "middle" matrix. In other words,
|
|
if `Q` is orthogonal, then ``Q * A * Q.T`` has the same eigenvalues as
|
|
``A``:
|
|
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
>>> x = np.random.random()
|
|
>>> Q = np.array([[np.cos(x), -np.sin(x)], [np.sin(x), np.cos(x)]])
|
|
>>> LA.norm(Q[0, :]), LA.norm(Q[1, :]), np.dot(Q[0, :],Q[1, :])
|
|
(1.0, 1.0, 0.0)
|
|
|
|
Now multiply a diagonal matrix by ``Q`` on one side and
|
|
by ``Q.T`` on the other:
|
|
|
|
>>> D = np.diag((-1,1))
|
|
>>> LA.eigvals(D)
|
|
array([-1., 1.])
|
|
>>> A = np.dot(Q, D)
|
|
>>> A = np.dot(A, Q.T)
|
|
>>> LA.eigvals(A)
|
|
array([ 1., -1.]) # random
|
|
|
|
"""
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
_assert_finite(a)
|
|
t, result_t = _commonType(a)
|
|
|
|
signature = 'D->D' if isComplexType(t) else 'd->D'
|
|
with errstate(call=_raise_linalgerror_eigenvalues_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
w = _umath_linalg.eigvals(a, signature=signature)
|
|
|
|
if not isComplexType(t):
|
|
if all(w.imag == 0):
|
|
w = w.real
|
|
result_t = _realType(result_t)
|
|
else:
|
|
result_t = _complexType(result_t)
|
|
|
|
return w.astype(result_t, copy=False)
|
|
|
|
|
|
def _eigvalsh_dispatcher(a, UPLO=None):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_eigvalsh_dispatcher)
|
|
def eigvalsh(a, UPLO='L'):
|
|
"""
|
|
Compute the eigenvalues of a complex Hermitian or real symmetric matrix.
|
|
|
|
Main difference from eigh: the eigenvectors are not computed.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
A complex- or real-valued matrix whose eigenvalues are to be
|
|
computed.
|
|
UPLO : {'L', 'U'}, optional
|
|
Specifies whether the calculation is done with the lower triangular
|
|
part of `a` ('L', default) or the upper triangular part ('U').
|
|
Irrespective of this value only the real parts of the diagonal will
|
|
be considered in the computation to preserve the notion of a Hermitian
|
|
matrix. It therefore follows that the imaginary part of the diagonal
|
|
will always be treated as zero.
|
|
|
|
Returns
|
|
-------
|
|
w : (..., M,) ndarray
|
|
The eigenvalues in ascending order, each repeated according to
|
|
its multiplicity.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the eigenvalue computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
eigh : eigenvalues and eigenvectors of real symmetric or complex Hermitian
|
|
(conjugate symmetric) arrays.
|
|
eigvals : eigenvalues of general real or complex arrays.
|
|
eig : eigenvalues and right eigenvectors of general real or complex
|
|
arrays.
|
|
scipy.linalg.eigvalsh : Similar function in SciPy.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
The eigenvalues are computed using LAPACK routines ``_syevd``, ``_heevd``.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.array([[1, -2j], [2j, 5]])
|
|
>>> LA.eigvalsh(a)
|
|
array([ 0.17157288, 5.82842712]) # may vary
|
|
|
|
>>> # demonstrate the treatment of the imaginary part of the diagonal
|
|
>>> a = np.array([[5+2j, 9-2j], [0+2j, 2-1j]])
|
|
>>> a
|
|
array([[5.+2.j, 9.-2.j],
|
|
[0.+2.j, 2.-1.j]])
|
|
>>> # with UPLO='L' this is numerically equivalent to using LA.eigvals()
|
|
>>> # with:
|
|
>>> b = np.array([[5.+0.j, 0.-2.j], [0.+2.j, 2.-0.j]])
|
|
>>> b
|
|
array([[5.+0.j, 0.-2.j],
|
|
[0.+2.j, 2.+0.j]])
|
|
>>> wa = LA.eigvalsh(a)
|
|
>>> wb = LA.eigvals(b)
|
|
>>> wa; wb
|
|
array([1., 6.])
|
|
array([6.+0.j, 1.+0.j])
|
|
|
|
"""
|
|
UPLO = UPLO.upper()
|
|
if UPLO not in ('L', 'U'):
|
|
raise ValueError("UPLO argument must be 'L' or 'U'")
|
|
|
|
if UPLO == 'L':
|
|
gufunc = _umath_linalg.eigvalsh_lo
|
|
else:
|
|
gufunc = _umath_linalg.eigvalsh_up
|
|
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
signature = 'D->d' if isComplexType(t) else 'd->d'
|
|
with errstate(call=_raise_linalgerror_eigenvalues_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
w = gufunc(a, signature=signature)
|
|
return w.astype(_realType(result_t), copy=False)
|
|
|
|
def _convertarray(a):
|
|
t, result_t = _commonType(a)
|
|
a = a.astype(t).T.copy()
|
|
return a, t, result_t
|
|
|
|
|
|
# Eigenvectors
|
|
|
|
|
|
@array_function_dispatch(_unary_dispatcher)
|
|
def eig(a):
|
|
"""
|
|
Compute the eigenvalues and right eigenvectors of a square array.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array
|
|
Matrices for which the eigenvalues and right eigenvectors will
|
|
be computed
|
|
|
|
Returns
|
|
-------
|
|
A namedtuple with the following attributes:
|
|
|
|
eigenvalues : (..., M) array
|
|
The eigenvalues, each repeated according to its multiplicity.
|
|
The eigenvalues are not necessarily ordered. The resulting
|
|
array will be of complex type, unless the imaginary part is
|
|
zero in which case it will be cast to a real type. When `a`
|
|
is real the resulting eigenvalues will be real (0 imaginary
|
|
part) or occur in conjugate pairs
|
|
|
|
eigenvectors : (..., M, M) array
|
|
The normalized (unit "length") eigenvectors, such that the
|
|
column ``eigenvectors[:,i]`` is the eigenvector corresponding to the
|
|
eigenvalue ``eigenvalues[i]``.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the eigenvalue computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
eigvals : eigenvalues of a non-symmetric array.
|
|
eigh : eigenvalues and eigenvectors of a real symmetric or complex
|
|
Hermitian (conjugate symmetric) array.
|
|
eigvalsh : eigenvalues of a real symmetric or complex Hermitian
|
|
(conjugate symmetric) array.
|
|
scipy.linalg.eig : Similar function in SciPy that also solves the
|
|
generalized eigenvalue problem.
|
|
scipy.linalg.schur : Best choice for unitary and other non-Hermitian
|
|
normal matrices.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
This is implemented using the ``_geev`` LAPACK routines which compute
|
|
the eigenvalues and eigenvectors of general square arrays.
|
|
|
|
The number `w` is an eigenvalue of `a` if there exists a vector `v` such
|
|
that ``a @ v = w * v``. Thus, the arrays `a`, `eigenvalues`, and
|
|
`eigenvectors` satisfy the equations ``a @ eigenvectors[:,i] =
|
|
eigenvalues[i] * eigenvectors[:,i]`` for :math:`i \\in \\{0,...,M-1\\}`.
|
|
|
|
The array `eigenvectors` may not be of maximum rank, that is, some of the
|
|
columns may be linearly dependent, although round-off error may obscure
|
|
that fact. If the eigenvalues are all different, then theoretically the
|
|
eigenvectors are linearly independent and `a` can be diagonalized by a
|
|
similarity transformation using `eigenvectors`, i.e, ``inv(eigenvectors) @
|
|
a @ eigenvectors`` is diagonal.
|
|
|
|
For non-Hermitian normal matrices the SciPy function `scipy.linalg.schur`
|
|
is preferred because the matrix `eigenvectors` is guaranteed to be
|
|
unitary, which is not the case when using `eig`. The Schur factorization
|
|
produces an upper triangular matrix rather than a diagonal matrix, but for
|
|
normal matrices only the diagonal of the upper triangular matrix is
|
|
needed, the rest is roundoff error.
|
|
|
|
Finally, it is emphasized that `eigenvectors` consists of the *right* (as
|
|
in right-hand side) eigenvectors of `a`. A vector `y` satisfying ``y.T @ a
|
|
= z * y.T`` for some number `z` is called a *left* eigenvector of `a`,
|
|
and, in general, the left and right eigenvectors of a matrix are not
|
|
necessarily the (perhaps conjugate) transposes of each other.
|
|
|
|
References
|
|
----------
|
|
G. Strang, *Linear Algebra and Its Applications*, 2nd Ed., Orlando, FL,
|
|
Academic Press, Inc., 1980, Various pp.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
|
|
(Almost) trivial example with real eigenvalues and eigenvectors.
|
|
|
|
>>> eigenvalues, eigenvectors = LA.eig(np.diag((1, 2, 3)))
|
|
>>> eigenvalues
|
|
array([1., 2., 3.])
|
|
>>> eigenvectors
|
|
array([[1., 0., 0.],
|
|
[0., 1., 0.],
|
|
[0., 0., 1.]])
|
|
|
|
Real matrix possessing complex eigenvalues and eigenvectors;
|
|
note that the eigenvalues are complex conjugates of each other.
|
|
|
|
>>> eigenvalues, eigenvectors = LA.eig(np.array([[1, -1], [1, 1]]))
|
|
>>> eigenvalues
|
|
array([1.+1.j, 1.-1.j])
|
|
>>> eigenvectors
|
|
array([[0.70710678+0.j , 0.70710678-0.j ],
|
|
[0. -0.70710678j, 0. +0.70710678j]])
|
|
|
|
Complex-valued matrix with real eigenvalues (but complex-valued
|
|
eigenvectors); note that ``a.conj().T == a``, i.e., `a` is Hermitian.
|
|
|
|
>>> a = np.array([[1, 1j], [-1j, 1]])
|
|
>>> eigenvalues, eigenvectors = LA.eig(a)
|
|
>>> eigenvalues
|
|
array([2.+0.j, 0.+0.j])
|
|
>>> eigenvectors
|
|
array([[ 0. +0.70710678j, 0.70710678+0.j ], # may vary
|
|
[ 0.70710678+0.j , -0. +0.70710678j]])
|
|
|
|
Be careful about round-off error!
|
|
|
|
>>> a = np.array([[1 + 1e-9, 0], [0, 1 - 1e-9]])
|
|
>>> # Theor. eigenvalues are 1 +/- 1e-9
|
|
>>> eigenvalues, eigenvectors = LA.eig(a)
|
|
>>> eigenvalues
|
|
array([1., 1.])
|
|
>>> eigenvectors
|
|
array([[1., 0.],
|
|
[0., 1.]])
|
|
|
|
"""
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
_assert_finite(a)
|
|
t, result_t = _commonType(a)
|
|
|
|
signature = 'D->DD' if isComplexType(t) else 'd->DD'
|
|
with errstate(call=_raise_linalgerror_eigenvalues_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
w, vt = _umath_linalg.eig(a, signature=signature)
|
|
|
|
if not isComplexType(t) and all(w.imag == 0.0):
|
|
w = w.real
|
|
vt = vt.real
|
|
result_t = _realType(result_t)
|
|
else:
|
|
result_t = _complexType(result_t)
|
|
|
|
vt = vt.astype(result_t, copy=False)
|
|
return EigResult(w.astype(result_t, copy=False), wrap(vt))
|
|
|
|
|
|
@array_function_dispatch(_eigvalsh_dispatcher)
|
|
def eigh(a, UPLO='L'):
|
|
"""
|
|
Return the eigenvalues and eigenvectors of a complex Hermitian
|
|
(conjugate symmetric) or a real symmetric matrix.
|
|
|
|
Returns two objects, a 1-D array containing the eigenvalues of `a`, and
|
|
a 2-D square array or matrix (depending on the input type) of the
|
|
corresponding eigenvectors (in columns).
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array
|
|
Hermitian or real symmetric matrices whose eigenvalues and
|
|
eigenvectors are to be computed.
|
|
UPLO : {'L', 'U'}, optional
|
|
Specifies whether the calculation is done with the lower triangular
|
|
part of `a` ('L', default) or the upper triangular part ('U').
|
|
Irrespective of this value only the real parts of the diagonal will
|
|
be considered in the computation to preserve the notion of a Hermitian
|
|
matrix. It therefore follows that the imaginary part of the diagonal
|
|
will always be treated as zero.
|
|
|
|
Returns
|
|
-------
|
|
A namedtuple with the following attributes:
|
|
|
|
eigenvalues : (..., M) ndarray
|
|
The eigenvalues in ascending order, each repeated according to
|
|
its multiplicity.
|
|
eigenvectors : {(..., M, M) ndarray, (..., M, M) matrix}
|
|
The column ``eigenvectors[:, i]`` is the normalized eigenvector
|
|
corresponding to the eigenvalue ``eigenvalues[i]``. Will return a
|
|
matrix object if `a` is a matrix object.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the eigenvalue computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
eigvalsh : eigenvalues of real symmetric or complex Hermitian
|
|
(conjugate symmetric) arrays.
|
|
eig : eigenvalues and right eigenvectors for non-symmetric arrays.
|
|
eigvals : eigenvalues of non-symmetric arrays.
|
|
scipy.linalg.eigh : Similar function in SciPy (but also solves the
|
|
generalized eigenvalue problem).
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
The eigenvalues/eigenvectors are computed using LAPACK routines ``_syevd``,
|
|
``_heevd``.
|
|
|
|
The eigenvalues of real symmetric or complex Hermitian matrices are always
|
|
real. [1]_ The array `eigenvalues` of (column) eigenvectors is unitary and
|
|
`a`, `eigenvalues`, and `eigenvectors` satisfy the equations ``dot(a,
|
|
eigenvectors[:, i]) = eigenvalues[i] * eigenvectors[:, i]``.
|
|
|
|
References
|
|
----------
|
|
.. [1] G. Strang, *Linear Algebra and Its Applications*, 2nd Ed., Orlando,
|
|
FL, Academic Press, Inc., 1980, pg. 222.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.array([[1, -2j], [2j, 5]])
|
|
>>> a
|
|
array([[ 1.+0.j, -0.-2.j],
|
|
[ 0.+2.j, 5.+0.j]])
|
|
>>> eigenvalues, eigenvectors = LA.eigh(a)
|
|
>>> eigenvalues
|
|
array([0.17157288, 5.82842712])
|
|
>>> eigenvectors
|
|
array([[-0.92387953+0.j , -0.38268343+0.j ], # may vary
|
|
[ 0. +0.38268343j, 0. -0.92387953j]])
|
|
|
|
>>> (np.dot(a, eigenvectors[:, 0]) -
|
|
... eigenvalues[0] * eigenvectors[:, 0]) # verify 1st eigenval/vec pair
|
|
array([5.55111512e-17+0.0000000e+00j, 0.00000000e+00+1.2490009e-16j])
|
|
>>> (np.dot(a, eigenvectors[:, 1]) -
|
|
... eigenvalues[1] * eigenvectors[:, 1]) # verify 2nd eigenval/vec pair
|
|
array([0.+0.j, 0.+0.j])
|
|
|
|
>>> A = np.matrix(a) # what happens if input is a matrix object
|
|
>>> A
|
|
matrix([[ 1.+0.j, -0.-2.j],
|
|
[ 0.+2.j, 5.+0.j]])
|
|
>>> eigenvalues, eigenvectors = LA.eigh(A)
|
|
>>> eigenvalues
|
|
array([0.17157288, 5.82842712])
|
|
>>> eigenvectors
|
|
matrix([[-0.92387953+0.j , -0.38268343+0.j ], # may vary
|
|
[ 0. +0.38268343j, 0. -0.92387953j]])
|
|
|
|
>>> # demonstrate the treatment of the imaginary part of the diagonal
|
|
>>> a = np.array([[5+2j, 9-2j], [0+2j, 2-1j]])
|
|
>>> a
|
|
array([[5.+2.j, 9.-2.j],
|
|
[0.+2.j, 2.-1.j]])
|
|
>>> # with UPLO='L' this is numerically equivalent to using LA.eig() with:
|
|
>>> b = np.array([[5.+0.j, 0.-2.j], [0.+2.j, 2.-0.j]])
|
|
>>> b
|
|
array([[5.+0.j, 0.-2.j],
|
|
[0.+2.j, 2.+0.j]])
|
|
>>> wa, va = LA.eigh(a)
|
|
>>> wb, vb = LA.eig(b)
|
|
>>> wa
|
|
array([1., 6.])
|
|
>>> wb
|
|
array([6.+0.j, 1.+0.j])
|
|
>>> va
|
|
array([[-0.4472136 +0.j , -0.89442719+0.j ], # may vary
|
|
[ 0. +0.89442719j, 0. -0.4472136j ]])
|
|
>>> vb
|
|
array([[ 0.89442719+0.j , -0. +0.4472136j],
|
|
[-0. +0.4472136j, 0.89442719+0.j ]])
|
|
|
|
"""
|
|
UPLO = UPLO.upper()
|
|
if UPLO not in ('L', 'U'):
|
|
raise ValueError("UPLO argument must be 'L' or 'U'")
|
|
|
|
a, wrap = _makearray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
|
|
if UPLO == 'L':
|
|
gufunc = _umath_linalg.eigh_lo
|
|
else:
|
|
gufunc = _umath_linalg.eigh_up
|
|
|
|
signature = 'D->dD' if isComplexType(t) else 'd->dd'
|
|
with errstate(call=_raise_linalgerror_eigenvalues_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
w, vt = gufunc(a, signature=signature)
|
|
w = w.astype(_realType(result_t), copy=False)
|
|
vt = vt.astype(result_t, copy=False)
|
|
return EighResult(w, wrap(vt))
|
|
|
|
|
|
# Singular value decomposition
|
|
|
|
def _svd_dispatcher(a, full_matrices=None, compute_uv=None, hermitian=None):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_svd_dispatcher)
|
|
def svd(a, full_matrices=True, compute_uv=True, hermitian=False):
|
|
"""
|
|
Singular Value Decomposition.
|
|
|
|
When `a` is a 2D array, and ``full_matrices=False``, then it is
|
|
factorized as ``u @ np.diag(s) @ vh = (u * s) @ vh``, where
|
|
`u` and the Hermitian transpose of `vh` are 2D arrays with
|
|
orthonormal columns and `s` is a 1D array of `a`'s singular
|
|
values. When `a` is higher-dimensional, SVD is applied in
|
|
stacked mode as explained below.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, N) array_like
|
|
A real or complex array with ``a.ndim >= 2``.
|
|
full_matrices : bool, optional
|
|
If True (default), `u` and `vh` have the shapes ``(..., M, M)`` and
|
|
``(..., N, N)``, respectively. Otherwise, the shapes are
|
|
``(..., M, K)`` and ``(..., K, N)``, respectively, where
|
|
``K = min(M, N)``.
|
|
compute_uv : bool, optional
|
|
Whether or not to compute `u` and `vh` in addition to `s`. True
|
|
by default.
|
|
hermitian : bool, optional
|
|
If True, `a` is assumed to be Hermitian (symmetric if real-valued),
|
|
enabling a more efficient method for finding singular values.
|
|
Defaults to False.
|
|
|
|
.. versionadded:: 1.17.0
|
|
|
|
Returns
|
|
-------
|
|
When `compute_uv` is True, the result is a namedtuple with the following
|
|
attribute names:
|
|
|
|
U : { (..., M, M), (..., M, K) } array
|
|
Unitary array(s). The first ``a.ndim - 2`` dimensions have the same
|
|
size as those of the input `a`. The size of the last two dimensions
|
|
depends on the value of `full_matrices`. Only returned when
|
|
`compute_uv` is True.
|
|
S : (..., K) array
|
|
Vector(s) with the singular values, within each vector sorted in
|
|
descending order. The first ``a.ndim - 2`` dimensions have the same
|
|
size as those of the input `a`.
|
|
Vh : { (..., N, N), (..., K, N) } array
|
|
Unitary array(s). The first ``a.ndim - 2`` dimensions have the same
|
|
size as those of the input `a`. The size of the last two dimensions
|
|
depends on the value of `full_matrices`. Only returned when
|
|
`compute_uv` is True.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If SVD computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.svd : Similar function in SciPy.
|
|
scipy.linalg.svdvals : Compute singular values of a matrix.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionchanged:: 1.8.0
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
The decomposition is performed using LAPACK routine ``_gesdd``.
|
|
|
|
SVD is usually described for the factorization of a 2D matrix :math:`A`.
|
|
The higher-dimensional case will be discussed below. In the 2D case, SVD is
|
|
written as :math:`A = U S V^H`, where :math:`A = a`, :math:`U= u`,
|
|
:math:`S= \\mathtt{np.diag}(s)` and :math:`V^H = vh`. The 1D array `s`
|
|
contains the singular values of `a` and `u` and `vh` are unitary. The rows
|
|
of `vh` are the eigenvectors of :math:`A^H A` and the columns of `u` are
|
|
the eigenvectors of :math:`A A^H`. In both cases the corresponding
|
|
(possibly non-zero) eigenvalues are given by ``s**2``.
|
|
|
|
If `a` has more than two dimensions, then broadcasting rules apply, as
|
|
explained in :ref:`routines.linalg-broadcasting`. This means that SVD is
|
|
working in "stacked" mode: it iterates over all indices of the first
|
|
``a.ndim - 2`` dimensions and for each combination SVD is applied to the
|
|
last two indices. The matrix `a` can be reconstructed from the
|
|
decomposition with either ``(u * s[..., None, :]) @ vh`` or
|
|
``u @ (s[..., None] * vh)``. (The ``@`` operator can be replaced by the
|
|
function ``np.matmul`` for python versions below 3.5.)
|
|
|
|
If `a` is a ``matrix`` object (as opposed to an ``ndarray``), then so are
|
|
all the return values.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> rng = np.random.default_rng()
|
|
>>> a = rng.normal(size=(9, 6)) + 1j*rng.normal(size=(9, 6))
|
|
>>> b = rng.normal(size=(2, 7, 8, 3)) + 1j*rng.normal(size=(2, 7, 8, 3))
|
|
|
|
|
|
Reconstruction based on full SVD, 2D case:
|
|
|
|
>>> U, S, Vh = np.linalg.svd(a, full_matrices=True)
|
|
>>> U.shape, S.shape, Vh.shape
|
|
((9, 9), (6,), (6, 6))
|
|
>>> np.allclose(a, np.dot(U[:, :6] * S, Vh))
|
|
True
|
|
>>> smat = np.zeros((9, 6), dtype=complex)
|
|
>>> smat[:6, :6] = np.diag(S)
|
|
>>> np.allclose(a, np.dot(U, np.dot(smat, Vh)))
|
|
True
|
|
|
|
Reconstruction based on reduced SVD, 2D case:
|
|
|
|
>>> U, S, Vh = np.linalg.svd(a, full_matrices=False)
|
|
>>> U.shape, S.shape, Vh.shape
|
|
((9, 6), (6,), (6, 6))
|
|
>>> np.allclose(a, np.dot(U * S, Vh))
|
|
True
|
|
>>> smat = np.diag(S)
|
|
>>> np.allclose(a, np.dot(U, np.dot(smat, Vh)))
|
|
True
|
|
|
|
Reconstruction based on full SVD, 4D case:
|
|
|
|
>>> U, S, Vh = np.linalg.svd(b, full_matrices=True)
|
|
>>> U.shape, S.shape, Vh.shape
|
|
((2, 7, 8, 8), (2, 7, 3), (2, 7, 3, 3))
|
|
>>> np.allclose(b, np.matmul(U[..., :3] * S[..., None, :], Vh))
|
|
True
|
|
>>> np.allclose(b, np.matmul(U[..., :3], S[..., None] * Vh))
|
|
True
|
|
|
|
Reconstruction based on reduced SVD, 4D case:
|
|
|
|
>>> U, S, Vh = np.linalg.svd(b, full_matrices=False)
|
|
>>> U.shape, S.shape, Vh.shape
|
|
((2, 7, 8, 3), (2, 7, 3), (2, 7, 3, 3))
|
|
>>> np.allclose(b, np.matmul(U * S[..., None, :], Vh))
|
|
True
|
|
>>> np.allclose(b, np.matmul(U, S[..., None] * Vh))
|
|
True
|
|
|
|
"""
|
|
import numpy as _nx
|
|
a, wrap = _makearray(a)
|
|
|
|
if hermitian:
|
|
# note: lapack svd returns eigenvalues with s ** 2 sorted descending,
|
|
# but eig returns s sorted ascending, so we re-order the eigenvalues
|
|
# and related arrays to have the correct order
|
|
if compute_uv:
|
|
s, u = eigh(a)
|
|
sgn = sign(s)
|
|
s = abs(s)
|
|
sidx = argsort(s)[..., ::-1]
|
|
sgn = _nx.take_along_axis(sgn, sidx, axis=-1)
|
|
s = _nx.take_along_axis(s, sidx, axis=-1)
|
|
u = _nx.take_along_axis(u, sidx[..., None, :], axis=-1)
|
|
# singular values are unsigned, move the sign into v
|
|
vt = transpose(u * sgn[..., None, :]).conjugate()
|
|
return SVDResult(wrap(u), s, wrap(vt))
|
|
else:
|
|
s = eigvalsh(a)
|
|
s = abs(s)
|
|
return sort(s)[..., ::-1]
|
|
|
|
_assert_stacked_2d(a)
|
|
t, result_t = _commonType(a)
|
|
|
|
m, n = a.shape[-2:]
|
|
if compute_uv:
|
|
if full_matrices:
|
|
gufunc = _umath_linalg.svd_f
|
|
else:
|
|
gufunc = _umath_linalg.svd_s
|
|
|
|
signature = 'D->DdD' if isComplexType(t) else 'd->ddd'
|
|
with errstate(call=_raise_linalgerror_svd_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
u, s, vh = gufunc(a, signature=signature)
|
|
u = u.astype(result_t, copy=False)
|
|
s = s.astype(_realType(result_t), copy=False)
|
|
vh = vh.astype(result_t, copy=False)
|
|
return SVDResult(wrap(u), s, wrap(vh))
|
|
else:
|
|
signature = 'D->d' if isComplexType(t) else 'd->d'
|
|
with errstate(call=_raise_linalgerror_svd_nonconvergence,
|
|
invalid='call', over='ignore', divide='ignore',
|
|
under='ignore'):
|
|
s = _umath_linalg.svd(a, signature=signature)
|
|
s = s.astype(_realType(result_t), copy=False)
|
|
return s
|
|
|
|
|
|
def _svdvals_dispatcher(x):
|
|
return (x,)
|
|
|
|
|
|
@array_function_dispatch(_svdvals_dispatcher)
|
|
def svdvals(x, /):
|
|
"""
|
|
Returns the singular values of a matrix (or a stack of matrices) ``x``.
|
|
When x is a stack of matrices, the function will compute the singular
|
|
values for each matrix in the stack.
|
|
|
|
This function is Array API compatible.
|
|
|
|
Calling ``np.svdvals(x)`` to get singular values is the same as
|
|
``np.svd(x, compute_uv=False, hermitian=False)``.
|
|
|
|
Parameters
|
|
----------
|
|
x : (..., M, N) array_like
|
|
Input array having shape (..., M, N) and whose last two
|
|
dimensions form matrices on which to perform singular value
|
|
decomposition. Should have a floating-point data type.
|
|
|
|
Returns
|
|
-------
|
|
out : ndarray
|
|
An array with shape (..., K) that contains the vector(s)
|
|
of singular values of length K, where K = min(M, N).
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.svdvals : Compute singular values of a matrix.
|
|
|
|
Examples
|
|
--------
|
|
|
|
>>> np.linalg.svdvals([[1, 2, 3, 4, 5],
|
|
... [1, 4, 9, 16, 25],
|
|
... [1, 8, 27, 64, 125]])
|
|
array([146.68862757, 5.57510612, 0.60393245])
|
|
|
|
Determine the rank of a matrix using singular values:
|
|
|
|
>>> s = np.linalg.svdvals([[1, 2, 3],
|
|
... [2, 4, 6],
|
|
... [-1, 1, -1]]); s
|
|
array([8.38434191e+00, 1.64402274e+00, 2.31534378e-16])
|
|
>>> np.count_nonzero(s > 1e-10) # Matrix of rank 2
|
|
2
|
|
|
|
"""
|
|
return svd(x, compute_uv=False, hermitian=False)
|
|
|
|
|
|
def _cond_dispatcher(x, p=None):
|
|
return (x,)
|
|
|
|
|
|
@array_function_dispatch(_cond_dispatcher)
|
|
def cond(x, p=None):
|
|
"""
|
|
Compute the condition number of a matrix.
|
|
|
|
This function is capable of returning the condition number using
|
|
one of seven different norms, depending on the value of `p` (see
|
|
Parameters below).
|
|
|
|
Parameters
|
|
----------
|
|
x : (..., M, N) array_like
|
|
The matrix whose condition number is sought.
|
|
p : {None, 1, -1, 2, -2, inf, -inf, 'fro'}, optional
|
|
Order of the norm used in the condition number computation:
|
|
|
|
===== ============================
|
|
p norm for matrices
|
|
===== ============================
|
|
None 2-norm, computed directly using the ``SVD``
|
|
'fro' Frobenius norm
|
|
inf max(sum(abs(x), axis=1))
|
|
-inf min(sum(abs(x), axis=1))
|
|
1 max(sum(abs(x), axis=0))
|
|
-1 min(sum(abs(x), axis=0))
|
|
2 2-norm (largest sing. value)
|
|
-2 smallest singular value
|
|
===== ============================
|
|
|
|
inf means the `numpy.inf` object, and the Frobenius norm is
|
|
the root-of-sum-of-squares norm.
|
|
|
|
Returns
|
|
-------
|
|
c : {float, inf}
|
|
The condition number of the matrix. May be infinite.
|
|
|
|
See Also
|
|
--------
|
|
numpy.linalg.norm
|
|
|
|
Notes
|
|
-----
|
|
The condition number of `x` is defined as the norm of `x` times the
|
|
norm of the inverse of `x` [1]_; the norm can be the usual L2-norm
|
|
(root-of-sum-of-squares) or one of a number of other matrix norms.
|
|
|
|
References
|
|
----------
|
|
.. [1] G. Strang, *Linear Algebra and Its Applications*, Orlando, FL,
|
|
Academic Press, Inc., 1980, pg. 285.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.array([[1, 0, -1], [0, 1, 0], [1, 0, 1]])
|
|
>>> a
|
|
array([[ 1, 0, -1],
|
|
[ 0, 1, 0],
|
|
[ 1, 0, 1]])
|
|
>>> LA.cond(a)
|
|
1.4142135623730951
|
|
>>> LA.cond(a, 'fro')
|
|
3.1622776601683795
|
|
>>> LA.cond(a, np.inf)
|
|
2.0
|
|
>>> LA.cond(a, -np.inf)
|
|
1.0
|
|
>>> LA.cond(a, 1)
|
|
2.0
|
|
>>> LA.cond(a, -1)
|
|
1.0
|
|
>>> LA.cond(a, 2)
|
|
1.4142135623730951
|
|
>>> LA.cond(a, -2)
|
|
0.70710678118654746 # may vary
|
|
>>> (min(LA.svd(a, compute_uv=False)) *
|
|
... min(LA.svd(LA.inv(a), compute_uv=False)))
|
|
0.70710678118654746 # may vary
|
|
|
|
"""
|
|
x = asarray(x) # in case we have a matrix
|
|
if _is_empty_2d(x):
|
|
raise LinAlgError("cond is not defined on empty arrays")
|
|
if p is None or p == 2 or p == -2:
|
|
s = svd(x, compute_uv=False)
|
|
with errstate(all='ignore'):
|
|
if p == -2:
|
|
r = s[..., -1] / s[..., 0]
|
|
else:
|
|
r = s[..., 0] / s[..., -1]
|
|
else:
|
|
# Call inv(x) ignoring errors. The result array will
|
|
# contain nans in the entries where inversion failed.
|
|
_assert_stacked_2d(x)
|
|
_assert_stacked_square(x)
|
|
t, result_t = _commonType(x)
|
|
signature = 'D->D' if isComplexType(t) else 'd->d'
|
|
with errstate(all='ignore'):
|
|
invx = _umath_linalg.inv(x, signature=signature)
|
|
r = norm(x, p, axis=(-2, -1)) * norm(invx, p, axis=(-2, -1))
|
|
r = r.astype(result_t, copy=False)
|
|
|
|
# Convert nans to infs unless the original array had nan entries
|
|
r = asarray(r)
|
|
nan_mask = isnan(r)
|
|
if nan_mask.any():
|
|
nan_mask &= ~isnan(x).any(axis=(-2, -1))
|
|
if r.ndim > 0:
|
|
r[nan_mask] = inf
|
|
elif nan_mask:
|
|
r[()] = inf
|
|
|
|
# Convention is to return scalars instead of 0d arrays
|
|
if r.ndim == 0:
|
|
r = r[()]
|
|
|
|
return r
|
|
|
|
|
|
def _matrix_rank_dispatcher(A, tol=None, hermitian=None, *, rtol=None):
|
|
return (A,)
|
|
|
|
|
|
@array_function_dispatch(_matrix_rank_dispatcher)
|
|
def matrix_rank(A, tol=None, hermitian=False, *, rtol=None):
|
|
"""
|
|
Return matrix rank of array using SVD method
|
|
|
|
Rank of the array is the number of singular values of the array that are
|
|
greater than `tol`.
|
|
|
|
.. versionchanged:: 1.14
|
|
Can now operate on stacks of matrices
|
|
|
|
Parameters
|
|
----------
|
|
A : {(M,), (..., M, N)} array_like
|
|
Input vector or stack of matrices.
|
|
tol : (...) array_like, float, optional
|
|
Threshold below which SVD values are considered zero. If `tol` is
|
|
None, and ``S`` is an array with singular values for `M`, and
|
|
``eps`` is the epsilon value for datatype of ``S``, then `tol` is
|
|
set to ``S.max() * max(M, N) * eps``.
|
|
|
|
.. versionchanged:: 1.14
|
|
Broadcasted against the stack of matrices
|
|
hermitian : bool, optional
|
|
If True, `A` is assumed to be Hermitian (symmetric if real-valued),
|
|
enabling a more efficient method for finding singular values.
|
|
Defaults to False.
|
|
|
|
.. versionadded:: 1.14
|
|
rtol : (...) array_like, float, optional
|
|
Parameter for the relative tolerance component. Only ``tol`` or
|
|
``rtol`` can be set at a time. Defaults to ``max(M, N) * eps``.
|
|
|
|
.. versionadded:: 2.0.0
|
|
|
|
Returns
|
|
-------
|
|
rank : (...) array_like
|
|
Rank of A.
|
|
|
|
Notes
|
|
-----
|
|
The default threshold to detect rank deficiency is a test on the magnitude
|
|
of the singular values of `A`. By default, we identify singular values
|
|
less than ``S.max() * max(M, N) * eps`` as indicating rank deficiency
|
|
(with the symbols defined above). This is the algorithm MATLAB uses [1].
|
|
It also appears in *Numerical recipes* in the discussion of SVD solutions
|
|
for linear least squares [2].
|
|
|
|
This default threshold is designed to detect rank deficiency accounting
|
|
for the numerical errors of the SVD computation. Imagine that there
|
|
is a column in `A` that is an exact (in floating point) linear combination
|
|
of other columns in `A`. Computing the SVD on `A` will not produce
|
|
a singular value exactly equal to 0 in general: any difference of
|
|
the smallest SVD value from 0 will be caused by numerical imprecision
|
|
in the calculation of the SVD. Our threshold for small SVD values takes
|
|
this numerical imprecision into account, and the default threshold will
|
|
detect such numerical rank deficiency. The threshold may declare a matrix
|
|
`A` rank deficient even if the linear combination of some columns of `A`
|
|
is not exactly equal to another column of `A` but only numerically very
|
|
close to another column of `A`.
|
|
|
|
We chose our default threshold because it is in wide use. Other thresholds
|
|
are possible. For example, elsewhere in the 2007 edition of *Numerical
|
|
recipes* there is an alternative threshold of ``S.max() *
|
|
np.finfo(A.dtype).eps / 2. * np.sqrt(m + n + 1.)``. The authors describe
|
|
this threshold as being based on "expected roundoff error" (p 71).
|
|
|
|
The thresholds above deal with floating point roundoff error in the
|
|
calculation of the SVD. However, you may have more information about
|
|
the sources of error in `A` that would make you consider other tolerance
|
|
values to detect *effective* rank deficiency. The most useful measure
|
|
of the tolerance depends on the operations you intend to use on your
|
|
matrix. For example, if your data come from uncertain measurements with
|
|
uncertainties greater than floating point epsilon, choosing a tolerance
|
|
near that uncertainty may be preferable. The tolerance may be absolute
|
|
if the uncertainties are absolute rather than relative.
|
|
|
|
References
|
|
----------
|
|
.. [1] MATLAB reference documentation, "Rank"
|
|
https://www.mathworks.com/help/techdoc/ref/rank.html
|
|
.. [2] W. H. Press, S. A. Teukolsky, W. T. Vetterling and B. P. Flannery,
|
|
"Numerical Recipes (3rd edition)", Cambridge University Press, 2007,
|
|
page 795.
|
|
|
|
Examples
|
|
--------
|
|
>>> import numpy as np
|
|
>>> from numpy.linalg import matrix_rank
|
|
>>> matrix_rank(np.eye(4)) # Full rank matrix
|
|
4
|
|
>>> I=np.eye(4); I[-1,-1] = 0. # rank deficient matrix
|
|
>>> matrix_rank(I)
|
|
3
|
|
>>> matrix_rank(np.ones((4,))) # 1 dimension - rank 1 unless all 0
|
|
1
|
|
>>> matrix_rank(np.zeros((4,)))
|
|
0
|
|
"""
|
|
if rtol is not None and tol is not None:
|
|
raise ValueError("`tol` and `rtol` can't be both set.")
|
|
|
|
A = asarray(A)
|
|
if A.ndim < 2:
|
|
return int(not all(A == 0))
|
|
S = svd(A, compute_uv=False, hermitian=hermitian)
|
|
|
|
if tol is None:
|
|
if rtol is None:
|
|
rtol = max(A.shape[-2:]) * finfo(S.dtype).eps
|
|
else:
|
|
rtol = asarray(rtol)[..., newaxis]
|
|
tol = S.max(axis=-1, keepdims=True) * rtol
|
|
else:
|
|
tol = asarray(tol)[..., newaxis]
|
|
|
|
return count_nonzero(S > tol, axis=-1)
|
|
|
|
|
|
# Generalized inverse
|
|
|
|
def _pinv_dispatcher(a, rcond=None, hermitian=None, *, rtol=None):
|
|
return (a,)
|
|
|
|
|
|
@array_function_dispatch(_pinv_dispatcher)
|
|
def pinv(a, rcond=None, hermitian=False, *, rtol=_NoValue):
|
|
"""
|
|
Compute the (Moore-Penrose) pseudo-inverse of a matrix.
|
|
|
|
Calculate the generalized inverse of a matrix using its
|
|
singular-value decomposition (SVD) and including all
|
|
*large* singular values.
|
|
|
|
.. versionchanged:: 1.14
|
|
Can now operate on stacks of matrices
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, N) array_like
|
|
Matrix or stack of matrices to be pseudo-inverted.
|
|
rcond : (...) array_like of float, optional
|
|
Cutoff for small singular values.
|
|
Singular values less than or equal to
|
|
``rcond * largest_singular_value`` are set to zero.
|
|
Broadcasts against the stack of matrices. Default: ``1e-15``.
|
|
hermitian : bool, optional
|
|
If True, `a` is assumed to be Hermitian (symmetric if real-valued),
|
|
enabling a more efficient method for finding singular values.
|
|
Defaults to False.
|
|
|
|
.. versionadded:: 1.17.0
|
|
rtol : (...) array_like of float, optional
|
|
Same as `rcond`, but it's an Array API compatible parameter name.
|
|
Only `rcond` or `rtol` can be set at a time. If none of them are
|
|
provided then NumPy's ``1e-15`` default is used. If ``rtol=None``
|
|
is passed then the API standard default is used.
|
|
|
|
.. versionadded:: 2.0.0
|
|
|
|
Returns
|
|
-------
|
|
B : (..., N, M) ndarray
|
|
The pseudo-inverse of `a`. If `a` is a `matrix` instance, then so
|
|
is `B`.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If the SVD computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.pinv : Similar function in SciPy.
|
|
scipy.linalg.pinvh : Compute the (Moore-Penrose) pseudo-inverse of a
|
|
Hermitian matrix.
|
|
|
|
Notes
|
|
-----
|
|
The pseudo-inverse of a matrix A, denoted :math:`A^+`, is
|
|
defined as: "the matrix that 'solves' [the least-squares problem]
|
|
:math:`Ax = b`," i.e., if :math:`\\bar{x}` is said solution, then
|
|
:math:`A^+` is that matrix such that :math:`\\bar{x} = A^+b`.
|
|
|
|
It can be shown that if :math:`Q_1 \\Sigma Q_2^T = A` is the singular
|
|
value decomposition of A, then
|
|
:math:`A^+ = Q_2 \\Sigma^+ Q_1^T`, where :math:`Q_{1,2}` are
|
|
orthogonal matrices, :math:`\\Sigma` is a diagonal matrix consisting
|
|
of A's so-called singular values, (followed, typically, by
|
|
zeros), and then :math:`\\Sigma^+` is simply the diagonal matrix
|
|
consisting of the reciprocals of A's singular values
|
|
(again, followed by zeros). [1]_
|
|
|
|
References
|
|
----------
|
|
.. [1] G. Strang, *Linear Algebra and Its Applications*, 2nd Ed., Orlando,
|
|
FL, Academic Press, Inc., 1980, pp. 139-142.
|
|
|
|
Examples
|
|
--------
|
|
The following example checks that ``a * a+ * a == a`` and
|
|
``a+ * a * a+ == a+``:
|
|
|
|
>>> import numpy as np
|
|
>>> rng = np.random.default_rng()
|
|
>>> a = rng.normal(size=(9, 6))
|
|
>>> B = np.linalg.pinv(a)
|
|
>>> np.allclose(a, np.dot(a, np.dot(B, a)))
|
|
True
|
|
>>> np.allclose(B, np.dot(B, np.dot(a, B)))
|
|
True
|
|
|
|
"""
|
|
a, wrap = _makearray(a)
|
|
if rcond is None:
|
|
if rtol is _NoValue:
|
|
rcond = 1e-15
|
|
elif rtol is None:
|
|
rcond = max(a.shape[-2:]) * finfo(a.dtype).eps
|
|
else:
|
|
rcond = rtol
|
|
elif rtol is not _NoValue:
|
|
raise ValueError("`rtol` and `rcond` can't be both set.")
|
|
else:
|
|
# NOTE: Deprecate `rcond` in a few versions.
|
|
pass
|
|
|
|
rcond = asarray(rcond)
|
|
if _is_empty_2d(a):
|
|
m, n = a.shape[-2:]
|
|
res = empty(a.shape[:-2] + (n, m), dtype=a.dtype)
|
|
return wrap(res)
|
|
a = a.conjugate()
|
|
u, s, vt = svd(a, full_matrices=False, hermitian=hermitian)
|
|
|
|
# discard small singular values
|
|
cutoff = rcond[..., newaxis] * amax(s, axis=-1, keepdims=True)
|
|
large = s > cutoff
|
|
s = divide(1, s, where=large, out=s)
|
|
s[~large] = 0
|
|
|
|
res = matmul(transpose(vt), multiply(s[..., newaxis], transpose(u)))
|
|
return wrap(res)
|
|
|
|
|
|
# Determinant
|
|
|
|
|
|
@array_function_dispatch(_unary_dispatcher)
|
|
def slogdet(a):
|
|
"""
|
|
Compute the sign and (natural) logarithm of the determinant of an array.
|
|
|
|
If an array has a very small or very large determinant, then a call to
|
|
`det` may overflow or underflow. This routine is more robust against such
|
|
issues, because it computes the logarithm of the determinant rather than
|
|
the determinant itself.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
Input array, has to be a square 2-D array.
|
|
|
|
Returns
|
|
-------
|
|
A namedtuple with the following attributes:
|
|
|
|
sign : (...) array_like
|
|
A number representing the sign of the determinant. For a real matrix,
|
|
this is 1, 0, or -1. For a complex matrix, this is a complex number
|
|
with absolute value 1 (i.e., it is on the unit circle), or else 0.
|
|
logabsdet : (...) array_like
|
|
The natural log of the absolute value of the determinant.
|
|
|
|
If the determinant is zero, then `sign` will be 0 and `logabsdet`
|
|
will be -inf. In all cases, the determinant is equal to
|
|
``sign * np.exp(logabsdet)``.
|
|
|
|
See Also
|
|
--------
|
|
det
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
.. versionadded:: 1.6.0
|
|
|
|
The determinant is computed via LU factorization using the LAPACK
|
|
routine ``z/dgetrf``.
|
|
|
|
|
|
Examples
|
|
--------
|
|
The determinant of a 2-D array ``[[a, b], [c, d]]`` is ``ad - bc``:
|
|
|
|
>>> import numpy as np
|
|
>>> a = np.array([[1, 2], [3, 4]])
|
|
>>> (sign, logabsdet) = np.linalg.slogdet(a)
|
|
>>> (sign, logabsdet)
|
|
(-1, 0.69314718055994529) # may vary
|
|
>>> sign * np.exp(logabsdet)
|
|
-2.0
|
|
|
|
Computing log-determinants for a stack of matrices:
|
|
|
|
>>> a = np.array([ [[1, 2], [3, 4]], [[1, 2], [2, 1]], [[1, 3], [3, 1]] ])
|
|
>>> a.shape
|
|
(3, 2, 2)
|
|
>>> sign, logabsdet = np.linalg.slogdet(a)
|
|
>>> (sign, logabsdet)
|
|
(array([-1., -1., -1.]), array([ 0.69314718, 1.09861229, 2.07944154]))
|
|
>>> sign * np.exp(logabsdet)
|
|
array([-2., -3., -8.])
|
|
|
|
This routine succeeds where ordinary `det` does not:
|
|
|
|
>>> np.linalg.det(np.eye(500) * 0.1)
|
|
0.0
|
|
>>> np.linalg.slogdet(np.eye(500) * 0.1)
|
|
(1, -1151.2925464970228)
|
|
|
|
"""
|
|
a = asarray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
real_t = _realType(result_t)
|
|
signature = 'D->Dd' if isComplexType(t) else 'd->dd'
|
|
sign, logdet = _umath_linalg.slogdet(a, signature=signature)
|
|
sign = sign.astype(result_t, copy=False)
|
|
logdet = logdet.astype(real_t, copy=False)
|
|
return SlogdetResult(sign, logdet)
|
|
|
|
|
|
@array_function_dispatch(_unary_dispatcher)
|
|
def det(a):
|
|
"""
|
|
Compute the determinant of an array.
|
|
|
|
Parameters
|
|
----------
|
|
a : (..., M, M) array_like
|
|
Input array to compute determinants for.
|
|
|
|
Returns
|
|
-------
|
|
det : (...) array_like
|
|
Determinant of `a`.
|
|
|
|
See Also
|
|
--------
|
|
slogdet : Another way to represent the determinant, more suitable
|
|
for large matrices where underflow/overflow may occur.
|
|
scipy.linalg.det : Similar function in SciPy.
|
|
|
|
Notes
|
|
-----
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
Broadcasting rules apply, see the `numpy.linalg` documentation for
|
|
details.
|
|
|
|
The determinant is computed via LU factorization using the LAPACK
|
|
routine ``z/dgetrf``.
|
|
|
|
Examples
|
|
--------
|
|
The determinant of a 2-D array [[a, b], [c, d]] is ad - bc:
|
|
|
|
>>> import numpy as np
|
|
>>> a = np.array([[1, 2], [3, 4]])
|
|
>>> np.linalg.det(a)
|
|
-2.0 # may vary
|
|
|
|
Computing determinants for a stack of matrices:
|
|
|
|
>>> a = np.array([ [[1, 2], [3, 4]], [[1, 2], [2, 1]], [[1, 3], [3, 1]] ])
|
|
>>> a.shape
|
|
(3, 2, 2)
|
|
>>> np.linalg.det(a)
|
|
array([-2., -3., -8.])
|
|
|
|
"""
|
|
a = asarray(a)
|
|
_assert_stacked_2d(a)
|
|
_assert_stacked_square(a)
|
|
t, result_t = _commonType(a)
|
|
signature = 'D->D' if isComplexType(t) else 'd->d'
|
|
r = _umath_linalg.det(a, signature=signature)
|
|
r = r.astype(result_t, copy=False)
|
|
return r
|
|
|
|
|
|
# Linear Least Squares
|
|
|
|
def _lstsq_dispatcher(a, b, rcond=None):
|
|
return (a, b)
|
|
|
|
|
|
@array_function_dispatch(_lstsq_dispatcher)
|
|
def lstsq(a, b, rcond=None):
|
|
r"""
|
|
Return the least-squares solution to a linear matrix equation.
|
|
|
|
Computes the vector `x` that approximately solves the equation
|
|
``a @ x = b``. The equation may be under-, well-, or over-determined
|
|
(i.e., the number of linearly independent rows of `a` can be less than,
|
|
equal to, or greater than its number of linearly independent columns).
|
|
If `a` is square and of full rank, then `x` (but for round-off error)
|
|
is the "exact" solution of the equation. Else, `x` minimizes the
|
|
Euclidean 2-norm :math:`||b - ax||`. If there are multiple minimizing
|
|
solutions, the one with the smallest 2-norm :math:`||x||` is returned.
|
|
|
|
Parameters
|
|
----------
|
|
a : (M, N) array_like
|
|
"Coefficient" matrix.
|
|
b : {(M,), (M, K)} array_like
|
|
Ordinate or "dependent variable" values. If `b` is two-dimensional,
|
|
the least-squares solution is calculated for each of the `K` columns
|
|
of `b`.
|
|
rcond : float, optional
|
|
Cut-off ratio for small singular values of `a`.
|
|
For the purposes of rank determination, singular values are treated
|
|
as zero if they are smaller than `rcond` times the largest singular
|
|
value of `a`.
|
|
The default uses the machine precision times ``max(M, N)``. Passing
|
|
``-1`` will use machine precision.
|
|
|
|
.. versionchanged:: 2.0
|
|
Previously, the default was ``-1``, but a warning was given that
|
|
this would change.
|
|
|
|
Returns
|
|
-------
|
|
x : {(N,), (N, K)} ndarray
|
|
Least-squares solution. If `b` is two-dimensional,
|
|
the solutions are in the `K` columns of `x`.
|
|
residuals : {(1,), (K,), (0,)} ndarray
|
|
Sums of squared residuals: Squared Euclidean 2-norm for each column in
|
|
``b - a @ x``.
|
|
If the rank of `a` is < N or M <= N, this is an empty array.
|
|
If `b` is 1-dimensional, this is a (1,) shape array.
|
|
Otherwise the shape is (K,).
|
|
rank : int
|
|
Rank of matrix `a`.
|
|
s : (min(M, N),) ndarray
|
|
Singular values of `a`.
|
|
|
|
Raises
|
|
------
|
|
LinAlgError
|
|
If computation does not converge.
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.lstsq : Similar function in SciPy.
|
|
|
|
Notes
|
|
-----
|
|
If `b` is a matrix, then all array results are returned as matrices.
|
|
|
|
Examples
|
|
--------
|
|
Fit a line, ``y = mx + c``, through some noisy data-points:
|
|
|
|
>>> import numpy as np
|
|
>>> x = np.array([0, 1, 2, 3])
|
|
>>> y = np.array([-1, 0.2, 0.9, 2.1])
|
|
|
|
By examining the coefficients, we see that the line should have a
|
|
gradient of roughly 1 and cut the y-axis at, more or less, -1.
|
|
|
|
We can rewrite the line equation as ``y = Ap``, where ``A = [[x 1]]``
|
|
and ``p = [[m], [c]]``. Now use `lstsq` to solve for `p`:
|
|
|
|
>>> A = np.vstack([x, np.ones(len(x))]).T
|
|
>>> A
|
|
array([[ 0., 1.],
|
|
[ 1., 1.],
|
|
[ 2., 1.],
|
|
[ 3., 1.]])
|
|
|
|
>>> m, c = np.linalg.lstsq(A, y)[0]
|
|
>>> m, c
|
|
(1.0 -0.95) # may vary
|
|
|
|
Plot the data along with the fitted line:
|
|
|
|
>>> import matplotlib.pyplot as plt
|
|
>>> _ = plt.plot(x, y, 'o', label='Original data', markersize=10)
|
|
>>> _ = plt.plot(x, m*x + c, 'r', label='Fitted line')
|
|
>>> _ = plt.legend()
|
|
>>> plt.show()
|
|
|
|
"""
|
|
a, _ = _makearray(a)
|
|
b, wrap = _makearray(b)
|
|
is_1d = b.ndim == 1
|
|
if is_1d:
|
|
b = b[:, newaxis]
|
|
_assert_2d(a, b)
|
|
m, n = a.shape[-2:]
|
|
m2, n_rhs = b.shape[-2:]
|
|
if m != m2:
|
|
raise LinAlgError('Incompatible dimensions')
|
|
|
|
t, result_t = _commonType(a, b)
|
|
result_real_t = _realType(result_t)
|
|
|
|
if rcond is None:
|
|
rcond = finfo(t).eps * max(n, m)
|
|
|
|
signature = 'DDd->Ddid' if isComplexType(t) else 'ddd->ddid'
|
|
if n_rhs == 0:
|
|
# lapack can't handle n_rhs = 0 - so allocate
|
|
# the array one larger in that axis
|
|
b = zeros(b.shape[:-2] + (m, n_rhs + 1), dtype=b.dtype)
|
|
|
|
with errstate(call=_raise_linalgerror_lstsq, invalid='call',
|
|
over='ignore', divide='ignore', under='ignore'):
|
|
x, resids, rank, s = _umath_linalg.lstsq(a, b, rcond,
|
|
signature=signature)
|
|
if m == 0:
|
|
x[...] = 0
|
|
if n_rhs == 0:
|
|
# remove the item we added
|
|
x = x[..., :n_rhs]
|
|
resids = resids[..., :n_rhs]
|
|
|
|
# remove the axis we added
|
|
if is_1d:
|
|
x = x.squeeze(axis=-1)
|
|
# we probably should squeeze resids too, but we can't
|
|
# without breaking compatibility.
|
|
|
|
# as documented
|
|
if rank != n or m <= n:
|
|
resids = array([], result_real_t)
|
|
|
|
# coerce output arrays
|
|
s = s.astype(result_real_t, copy=False)
|
|
resids = resids.astype(result_real_t, copy=False)
|
|
# Copying lets the memory in r_parts be freed
|
|
x = x.astype(result_t, copy=True)
|
|
return wrap(x), wrap(resids), rank, s
|
|
|
|
|
|
def _multi_svd_norm(x, row_axis, col_axis, op):
|
|
"""Compute a function of the singular values of the 2-D matrices in `x`.
|
|
|
|
This is a private utility function used by `numpy.linalg.norm()`.
|
|
|
|
Parameters
|
|
----------
|
|
x : ndarray
|
|
row_axis, col_axis : int
|
|
The axes of `x` that hold the 2-D matrices.
|
|
op : callable
|
|
This should be either numpy.amin or `numpy.amax` or `numpy.sum`.
|
|
|
|
Returns
|
|
-------
|
|
result : float or ndarray
|
|
If `x` is 2-D, the return values is a float.
|
|
Otherwise, it is an array with ``x.ndim - 2`` dimensions.
|
|
The return values are either the minimum or maximum or sum of the
|
|
singular values of the matrices, depending on whether `op`
|
|
is `numpy.amin` or `numpy.amax` or `numpy.sum`.
|
|
|
|
"""
|
|
y = moveaxis(x, (row_axis, col_axis), (-2, -1))
|
|
result = op(svd(y, compute_uv=False), axis=-1)
|
|
return result
|
|
|
|
|
|
def _norm_dispatcher(x, ord=None, axis=None, keepdims=None):
|
|
return (x,)
|
|
|
|
|
|
@array_function_dispatch(_norm_dispatcher)
|
|
def norm(x, ord=None, axis=None, keepdims=False):
|
|
"""
|
|
Matrix or vector norm.
|
|
|
|
This function is able to return one of eight different matrix norms,
|
|
or one of an infinite number of vector norms (described below), depending
|
|
on the value of the ``ord`` parameter.
|
|
|
|
Parameters
|
|
----------
|
|
x : array_like
|
|
Input array. If `axis` is None, `x` must be 1-D or 2-D, unless `ord`
|
|
is None. If both `axis` and `ord` are None, the 2-norm of
|
|
``x.ravel`` will be returned.
|
|
ord : {non-zero int, inf, -inf, 'fro', 'nuc'}, optional
|
|
Order of the norm (see table under ``Notes``). inf means numpy's
|
|
`inf` object. The default is None.
|
|
axis : {None, int, 2-tuple of ints}, optional.
|
|
If `axis` is an integer, it specifies the axis of `x` along which to
|
|
compute the vector norms. If `axis` is a 2-tuple, it specifies the
|
|
axes that hold 2-D matrices, and the matrix norms of these matrices
|
|
are computed. If `axis` is None then either a vector norm (when `x`
|
|
is 1-D) or a matrix norm (when `x` is 2-D) is returned. The default
|
|
is None.
|
|
|
|
.. versionadded:: 1.8.0
|
|
|
|
keepdims : bool, optional
|
|
If this is set to True, the axes which are normed over are left in the
|
|
result as dimensions with size one. With this option the result will
|
|
broadcast correctly against the original `x`.
|
|
|
|
.. versionadded:: 1.10.0
|
|
|
|
Returns
|
|
-------
|
|
n : float or ndarray
|
|
Norm of the matrix or vector(s).
|
|
|
|
See Also
|
|
--------
|
|
scipy.linalg.norm : Similar function in SciPy.
|
|
|
|
Notes
|
|
-----
|
|
For values of ``ord < 1``, the result is, strictly speaking, not a
|
|
mathematical 'norm', but it may still be useful for various numerical
|
|
purposes.
|
|
|
|
The following norms can be calculated:
|
|
|
|
===== ============================ ==========================
|
|
ord norm for matrices norm for vectors
|
|
===== ============================ ==========================
|
|
None Frobenius norm 2-norm
|
|
'fro' Frobenius norm --
|
|
'nuc' nuclear norm --
|
|
inf max(sum(abs(x), axis=1)) max(abs(x))
|
|
-inf min(sum(abs(x), axis=1)) min(abs(x))
|
|
0 -- sum(x != 0)
|
|
1 max(sum(abs(x), axis=0)) as below
|
|
-1 min(sum(abs(x), axis=0)) as below
|
|
2 2-norm (largest sing. value) as below
|
|
-2 smallest singular value as below
|
|
other -- sum(abs(x)**ord)**(1./ord)
|
|
===== ============================ ==========================
|
|
|
|
The Frobenius norm is given by [1]_:
|
|
|
|
:math:`||A||_F = [\\sum_{i,j} abs(a_{i,j})^2]^{1/2}`
|
|
|
|
The nuclear norm is the sum of the singular values.
|
|
|
|
Both the Frobenius and nuclear norm orders are only defined for
|
|
matrices and raise a ValueError when ``x.ndim != 2``.
|
|
|
|
References
|
|
----------
|
|
.. [1] G. H. Golub and C. F. Van Loan, *Matrix Computations*,
|
|
Baltimore, MD, Johns Hopkins University Press, 1985, pg. 15
|
|
|
|
Examples
|
|
--------
|
|
|
|
>>> import numpy as np
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.arange(9) - 4
|
|
>>> a
|
|
array([-4, -3, -2, ..., 2, 3, 4])
|
|
>>> b = a.reshape((3, 3))
|
|
>>> b
|
|
array([[-4, -3, -2],
|
|
[-1, 0, 1],
|
|
[ 2, 3, 4]])
|
|
|
|
>>> LA.norm(a)
|
|
7.745966692414834
|
|
>>> LA.norm(b)
|
|
7.745966692414834
|
|
>>> LA.norm(b, 'fro')
|
|
7.745966692414834
|
|
>>> LA.norm(a, np.inf)
|
|
4.0
|
|
>>> LA.norm(b, np.inf)
|
|
9.0
|
|
>>> LA.norm(a, -np.inf)
|
|
0.0
|
|
>>> LA.norm(b, -np.inf)
|
|
2.0
|
|
|
|
>>> LA.norm(a, 1)
|
|
20.0
|
|
>>> LA.norm(b, 1)
|
|
7.0
|
|
>>> LA.norm(a, -1)
|
|
-4.6566128774142013e-010
|
|
>>> LA.norm(b, -1)
|
|
6.0
|
|
>>> LA.norm(a, 2)
|
|
7.745966692414834
|
|
>>> LA.norm(b, 2)
|
|
7.3484692283495345
|
|
|
|
>>> LA.norm(a, -2)
|
|
0.0
|
|
>>> LA.norm(b, -2)
|
|
1.8570331885190563e-016 # may vary
|
|
>>> LA.norm(a, 3)
|
|
5.8480354764257312 # may vary
|
|
>>> LA.norm(a, -3)
|
|
0.0
|
|
|
|
Using the `axis` argument to compute vector norms:
|
|
|
|
>>> c = np.array([[ 1, 2, 3],
|
|
... [-1, 1, 4]])
|
|
>>> LA.norm(c, axis=0)
|
|
array([ 1.41421356, 2.23606798, 5. ])
|
|
>>> LA.norm(c, axis=1)
|
|
array([ 3.74165739, 4.24264069])
|
|
>>> LA.norm(c, ord=1, axis=1)
|
|
array([ 6., 6.])
|
|
|
|
Using the `axis` argument to compute matrix norms:
|
|
|
|
>>> m = np.arange(8).reshape(2,2,2)
|
|
>>> LA.norm(m, axis=(1,2))
|
|
array([ 3.74165739, 11.22497216])
|
|
>>> LA.norm(m[0, :, :]), LA.norm(m[1, :, :])
|
|
(3.7416573867739413, 11.224972160321824)
|
|
|
|
"""
|
|
x = asarray(x)
|
|
|
|
if not issubclass(x.dtype.type, (inexact, object_)):
|
|
x = x.astype(float)
|
|
|
|
# Immediately handle some default, simple, fast, and common cases.
|
|
if axis is None:
|
|
ndim = x.ndim
|
|
if (
|
|
(ord is None) or
|
|
(ord in ('f', 'fro') and ndim == 2) or
|
|
(ord == 2 and ndim == 1)
|
|
):
|
|
x = x.ravel(order='K')
|
|
if isComplexType(x.dtype.type):
|
|
x_real = x.real
|
|
x_imag = x.imag
|
|
sqnorm = x_real.dot(x_real) + x_imag.dot(x_imag)
|
|
else:
|
|
sqnorm = x.dot(x)
|
|
ret = sqrt(sqnorm)
|
|
if keepdims:
|
|
ret = ret.reshape(ndim*[1])
|
|
return ret
|
|
|
|
# Normalize the `axis` argument to a tuple.
|
|
nd = x.ndim
|
|
if axis is None:
|
|
axis = tuple(range(nd))
|
|
elif not isinstance(axis, tuple):
|
|
try:
|
|
axis = int(axis)
|
|
except Exception as e:
|
|
raise TypeError(
|
|
"'axis' must be None, an integer or a tuple of integers"
|
|
) from e
|
|
axis = (axis,)
|
|
|
|
if len(axis) == 1:
|
|
if ord == inf:
|
|
return abs(x).max(axis=axis, keepdims=keepdims)
|
|
elif ord == -inf:
|
|
return abs(x).min(axis=axis, keepdims=keepdims)
|
|
elif ord == 0:
|
|
# Zero norm
|
|
return (
|
|
(x != 0)
|
|
.astype(x.real.dtype)
|
|
.sum(axis=axis, keepdims=keepdims)
|
|
)
|
|
elif ord == 1:
|
|
# special case for speedup
|
|
return add.reduce(abs(x), axis=axis, keepdims=keepdims)
|
|
elif ord is None or ord == 2:
|
|
# special case for speedup
|
|
s = (x.conj() * x).real
|
|
return sqrt(add.reduce(s, axis=axis, keepdims=keepdims))
|
|
# None of the str-type keywords for ord ('fro', 'nuc')
|
|
# are valid for vectors
|
|
elif isinstance(ord, str):
|
|
raise ValueError(f"Invalid norm order '{ord}' for vectors")
|
|
else:
|
|
absx = abs(x)
|
|
absx **= ord
|
|
ret = add.reduce(absx, axis=axis, keepdims=keepdims)
|
|
ret **= reciprocal(ord, dtype=ret.dtype)
|
|
return ret
|
|
elif len(axis) == 2:
|
|
row_axis, col_axis = axis
|
|
row_axis = normalize_axis_index(row_axis, nd)
|
|
col_axis = normalize_axis_index(col_axis, nd)
|
|
if row_axis == col_axis:
|
|
raise ValueError('Duplicate axes given.')
|
|
if ord == 2:
|
|
ret = _multi_svd_norm(x, row_axis, col_axis, amax)
|
|
elif ord == -2:
|
|
ret = _multi_svd_norm(x, row_axis, col_axis, amin)
|
|
elif ord == 1:
|
|
if col_axis > row_axis:
|
|
col_axis -= 1
|
|
ret = add.reduce(abs(x), axis=row_axis).max(axis=col_axis)
|
|
elif ord == inf:
|
|
if row_axis > col_axis:
|
|
row_axis -= 1
|
|
ret = add.reduce(abs(x), axis=col_axis).max(axis=row_axis)
|
|
elif ord == -1:
|
|
if col_axis > row_axis:
|
|
col_axis -= 1
|
|
ret = add.reduce(abs(x), axis=row_axis).min(axis=col_axis)
|
|
elif ord == -inf:
|
|
if row_axis > col_axis:
|
|
row_axis -= 1
|
|
ret = add.reduce(abs(x), axis=col_axis).min(axis=row_axis)
|
|
elif ord in [None, 'fro', 'f']:
|
|
ret = sqrt(add.reduce((x.conj() * x).real, axis=axis))
|
|
elif ord == 'nuc':
|
|
ret = _multi_svd_norm(x, row_axis, col_axis, sum)
|
|
else:
|
|
raise ValueError("Invalid norm order for matrices.")
|
|
if keepdims:
|
|
ret_shape = list(x.shape)
|
|
ret_shape[axis[0]] = 1
|
|
ret_shape[axis[1]] = 1
|
|
ret = ret.reshape(ret_shape)
|
|
return ret
|
|
else:
|
|
raise ValueError("Improper number of dimensions to norm.")
|
|
|
|
|
|
# multi_dot
|
|
|
|
def _multidot_dispatcher(arrays, *, out=None):
|
|
yield from arrays
|
|
yield out
|
|
|
|
|
|
@array_function_dispatch(_multidot_dispatcher)
|
|
def multi_dot(arrays, *, out=None):
|
|
"""
|
|
Compute the dot product of two or more arrays in a single function call,
|
|
while automatically selecting the fastest evaluation order.
|
|
|
|
`multi_dot` chains `numpy.dot` and uses optimal parenthesization
|
|
of the matrices [1]_ [2]_. Depending on the shapes of the matrices,
|
|
this can speed up the multiplication a lot.
|
|
|
|
If the first argument is 1-D it is treated as a row vector.
|
|
If the last argument is 1-D it is treated as a column vector.
|
|
The other arguments must be 2-D.
|
|
|
|
Think of `multi_dot` as::
|
|
|
|
def multi_dot(arrays): return functools.reduce(np.dot, arrays)
|
|
|
|
|
|
Parameters
|
|
----------
|
|
arrays : sequence of array_like
|
|
If the first argument is 1-D it is treated as row vector.
|
|
If the last argument is 1-D it is treated as column vector.
|
|
The other arguments must be 2-D.
|
|
out : ndarray, optional
|
|
Output argument. This must have the exact kind that would be returned
|
|
if it was not used. In particular, it must have the right type, must be
|
|
C-contiguous, and its dtype must be the dtype that would be returned
|
|
for `dot(a, b)`. This is a performance feature. Therefore, if these
|
|
conditions are not met, an exception is raised, instead of attempting
|
|
to be flexible.
|
|
|
|
.. versionadded:: 1.19.0
|
|
|
|
Returns
|
|
-------
|
|
output : ndarray
|
|
Returns the dot product of the supplied arrays.
|
|
|
|
See Also
|
|
--------
|
|
numpy.dot : dot multiplication with two arguments.
|
|
|
|
References
|
|
----------
|
|
|
|
.. [1] Cormen, "Introduction to Algorithms", Chapter 15.2, p. 370-378
|
|
.. [2] https://en.wikipedia.org/wiki/Matrix_chain_multiplication
|
|
|
|
Examples
|
|
--------
|
|
`multi_dot` allows you to write::
|
|
|
|
>>> import numpy as np
|
|
>>> from numpy.linalg import multi_dot
|
|
>>> # Prepare some data
|
|
>>> A = np.random.random((10000, 100))
|
|
>>> B = np.random.random((100, 1000))
|
|
>>> C = np.random.random((1000, 5))
|
|
>>> D = np.random.random((5, 333))
|
|
>>> # the actual dot multiplication
|
|
>>> _ = multi_dot([A, B, C, D])
|
|
|
|
instead of::
|
|
|
|
>>> _ = np.dot(np.dot(np.dot(A, B), C), D)
|
|
>>> # or
|
|
>>> _ = A.dot(B).dot(C).dot(D)
|
|
|
|
Notes
|
|
-----
|
|
The cost for a matrix multiplication can be calculated with the
|
|
following function::
|
|
|
|
def cost(A, B):
|
|
return A.shape[0] * A.shape[1] * B.shape[1]
|
|
|
|
Assume we have three matrices
|
|
:math:`A_{10x100}, B_{100x5}, C_{5x50}`.
|
|
|
|
The costs for the two different parenthesizations are as follows::
|
|
|
|
cost((AB)C) = 10*100*5 + 10*5*50 = 5000 + 2500 = 7500
|
|
cost(A(BC)) = 10*100*50 + 100*5*50 = 50000 + 25000 = 75000
|
|
|
|
"""
|
|
n = len(arrays)
|
|
# optimization only makes sense for len(arrays) > 2
|
|
if n < 2:
|
|
raise ValueError("Expecting at least two arrays.")
|
|
elif n == 2:
|
|
return dot(arrays[0], arrays[1], out=out)
|
|
|
|
arrays = [asanyarray(a) for a in arrays]
|
|
|
|
# save original ndim to reshape the result array into the proper form later
|
|
ndim_first, ndim_last = arrays[0].ndim, arrays[-1].ndim
|
|
# Explicitly convert vectors to 2D arrays to keep the logic of the internal
|
|
# _multi_dot_* functions as simple as possible.
|
|
if arrays[0].ndim == 1:
|
|
arrays[0] = atleast_2d(arrays[0])
|
|
if arrays[-1].ndim == 1:
|
|
arrays[-1] = atleast_2d(arrays[-1]).T
|
|
_assert_2d(*arrays)
|
|
|
|
# _multi_dot_three is much faster than _multi_dot_matrix_chain_order
|
|
if n == 3:
|
|
result = _multi_dot_three(arrays[0], arrays[1], arrays[2], out=out)
|
|
else:
|
|
order = _multi_dot_matrix_chain_order(arrays)
|
|
result = _multi_dot(arrays, order, 0, n - 1, out=out)
|
|
|
|
# return proper shape
|
|
if ndim_first == 1 and ndim_last == 1:
|
|
return result[0, 0] # scalar
|
|
elif ndim_first == 1 or ndim_last == 1:
|
|
return result.ravel() # 1-D
|
|
else:
|
|
return result
|
|
|
|
|
|
def _multi_dot_three(A, B, C, out=None):
|
|
"""
|
|
Find the best order for three arrays and do the multiplication.
|
|
|
|
For three arguments `_multi_dot_three` is approximately 15 times faster
|
|
than `_multi_dot_matrix_chain_order`
|
|
|
|
"""
|
|
a0, a1b0 = A.shape
|
|
b1c0, c1 = C.shape
|
|
# cost1 = cost((AB)C) = a0*a1b0*b1c0 + a0*b1c0*c1
|
|
cost1 = a0 * b1c0 * (a1b0 + c1)
|
|
# cost2 = cost(A(BC)) = a1b0*b1c0*c1 + a0*a1b0*c1
|
|
cost2 = a1b0 * c1 * (a0 + b1c0)
|
|
|
|
if cost1 < cost2:
|
|
return dot(dot(A, B), C, out=out)
|
|
else:
|
|
return dot(A, dot(B, C), out=out)
|
|
|
|
|
|
def _multi_dot_matrix_chain_order(arrays, return_costs=False):
|
|
"""
|
|
Return a np.array that encodes the optimal order of multiplications.
|
|
|
|
The optimal order array is then used by `_multi_dot()` to do the
|
|
multiplication.
|
|
|
|
Also return the cost matrix if `return_costs` is `True`
|
|
|
|
The implementation CLOSELY follows Cormen, "Introduction to Algorithms",
|
|
Chapter 15.2, p. 370-378. Note that Cormen uses 1-based indices.
|
|
|
|
cost[i, j] = min([
|
|
cost[prefix] + cost[suffix] + cost_mult(prefix, suffix)
|
|
for k in range(i, j)])
|
|
|
|
"""
|
|
n = len(arrays)
|
|
# p stores the dimensions of the matrices
|
|
# Example for p: A_{10x100}, B_{100x5}, C_{5x50} --> p = [10, 100, 5, 50]
|
|
p = [a.shape[0] for a in arrays] + [arrays[-1].shape[1]]
|
|
# m is a matrix of costs of the subproblems
|
|
# m[i,j]: min number of scalar multiplications needed to compute A_{i..j}
|
|
m = zeros((n, n), dtype=double)
|
|
# s is the actual ordering
|
|
# s[i, j] is the value of k at which we split the product A_i..A_j
|
|
s = empty((n, n), dtype=intp)
|
|
|
|
for l in range(1, n):
|
|
for i in range(n - l):
|
|
j = i + l
|
|
m[i, j] = inf
|
|
for k in range(i, j):
|
|
q = m[i, k] + m[k+1, j] + p[i]*p[k+1]*p[j+1]
|
|
if q < m[i, j]:
|
|
m[i, j] = q
|
|
s[i, j] = k # Note that Cormen uses 1-based index
|
|
|
|
return (s, m) if return_costs else s
|
|
|
|
|
|
def _multi_dot(arrays, order, i, j, out=None):
|
|
"""Actually do the multiplication with the given order."""
|
|
if i == j:
|
|
# the initial call with non-None out should never get here
|
|
assert out is None
|
|
|
|
return arrays[i]
|
|
else:
|
|
return dot(_multi_dot(arrays, order, i, order[i, j]),
|
|
_multi_dot(arrays, order, order[i, j] + 1, j),
|
|
out=out)
|
|
|
|
|
|
# diagonal
|
|
|
|
def _diagonal_dispatcher(x, /, *, offset=None):
|
|
return (x,)
|
|
|
|
|
|
@array_function_dispatch(_diagonal_dispatcher)
|
|
def diagonal(x, /, *, offset=0):
|
|
"""
|
|
Returns specified diagonals of a matrix (or a stack of matrices) ``x``.
|
|
|
|
This function is Array API compatible, contrary to
|
|
:py:func:`numpy.diagonal`, the matrix is assumed
|
|
to be defined by the last two dimensions.
|
|
|
|
Parameters
|
|
----------
|
|
x : (...,M,N) array_like
|
|
Input array having shape (..., M, N) and whose innermost two
|
|
dimensions form MxN matrices.
|
|
offset : int, optional
|
|
Offset specifying the off-diagonal relative to the main diagonal,
|
|
where::
|
|
|
|
* offset = 0: the main diagonal.
|
|
* offset > 0: off-diagonal above the main diagonal.
|
|
* offset < 0: off-diagonal below the main diagonal.
|
|
|
|
Returns
|
|
-------
|
|
out : (...,min(N,M)) ndarray
|
|
An array containing the diagonals and whose shape is determined by
|
|
removing the last two dimensions and appending a dimension equal to
|
|
the size of the resulting diagonals. The returned array must have
|
|
the same data type as ``x``.
|
|
|
|
See Also
|
|
--------
|
|
numpy.diagonal
|
|
|
|
Examples
|
|
--------
|
|
>>> a = np.arange(4).reshape(2, 2); a
|
|
array([[0, 1],
|
|
[2, 3]])
|
|
>>> np.linalg.diagonal(a)
|
|
array([0, 3])
|
|
|
|
A 3-D example:
|
|
|
|
>>> a = np.arange(8).reshape(2, 2, 2); a
|
|
array([[[0, 1],
|
|
[2, 3]],
|
|
[[4, 5],
|
|
[6, 7]]])
|
|
>>> np.linalg.diagonal(a)
|
|
array([[0, 3],
|
|
[4, 7]])
|
|
|
|
Diagonals adjacent to the main diagonal can be obtained by using the
|
|
`offset` argument:
|
|
|
|
>>> a = np.arange(9).reshape(3, 3)
|
|
>>> a
|
|
array([[0, 1, 2],
|
|
[3, 4, 5],
|
|
[6, 7, 8]])
|
|
>>> np.linalg.diagonal(a, offset=1) # First superdiagonal
|
|
array([1, 5])
|
|
>>> np.linalg.diagonal(a, offset=2) # Second superdiagonal
|
|
array([2])
|
|
>>> np.linalg.diagonal(a, offset=-1) # First subdiagonal
|
|
array([3, 7])
|
|
>>> np.linalg.diagonal(a, offset=-2) # Second subdiagonal
|
|
array([6])
|
|
|
|
The anti-diagonal can be obtained by reversing the order of elements
|
|
using either `numpy.flipud` or `numpy.fliplr`.
|
|
|
|
>>> a = np.arange(9).reshape(3, 3)
|
|
>>> a
|
|
array([[0, 1, 2],
|
|
[3, 4, 5],
|
|
[6, 7, 8]])
|
|
>>> np.linalg.diagonal(np.fliplr(a)) # Horizontal flip
|
|
array([2, 4, 6])
|
|
>>> np.linalg.diagonal(np.flipud(a)) # Vertical flip
|
|
array([6, 4, 2])
|
|
|
|
Note that the order in which the diagonal is retrieved varies depending
|
|
on the flip function.
|
|
|
|
"""
|
|
return _core_diagonal(x, offset, axis1=-2, axis2=-1)
|
|
|
|
|
|
# trace
|
|
|
|
def _trace_dispatcher(x, /, *, offset=None, dtype=None):
|
|
return (x,)
|
|
|
|
|
|
@array_function_dispatch(_trace_dispatcher)
|
|
def trace(x, /, *, offset=0, dtype=None):
|
|
"""
|
|
Returns the sum along the specified diagonals of a matrix
|
|
(or a stack of matrices) ``x``.
|
|
|
|
This function is Array API compatible, contrary to
|
|
:py:func:`numpy.trace`.
|
|
|
|
Parameters
|
|
----------
|
|
x : (...,M,N) array_like
|
|
Input array having shape (..., M, N) and whose innermost two
|
|
dimensions form MxN matrices.
|
|
offset : int, optional
|
|
Offset specifying the off-diagonal relative to the main diagonal,
|
|
where::
|
|
|
|
* offset = 0: the main diagonal.
|
|
* offset > 0: off-diagonal above the main diagonal.
|
|
* offset < 0: off-diagonal below the main diagonal.
|
|
|
|
dtype : dtype, optional
|
|
Data type of the returned array.
|
|
|
|
Returns
|
|
-------
|
|
out : ndarray
|
|
An array containing the traces and whose shape is determined by
|
|
removing the last two dimensions and storing the traces in the last
|
|
array dimension. For example, if x has rank k and shape:
|
|
(I, J, K, ..., L, M, N), then an output array has rank k-2 and shape:
|
|
(I, J, K, ..., L) where::
|
|
|
|
out[i, j, k, ..., l] = trace(a[i, j, k, ..., l, :, :])
|
|
|
|
The returned array must have a data type as described by the dtype
|
|
parameter above.
|
|
|
|
See Also
|
|
--------
|
|
numpy.trace
|
|
|
|
Examples
|
|
--------
|
|
>>> np.linalg.trace(np.eye(3))
|
|
3.0
|
|
>>> a = np.arange(8).reshape((2, 2, 2))
|
|
>>> np.linalg.trace(a)
|
|
array([3, 11])
|
|
|
|
Trace is computed with the last two axes as the 2-d sub-arrays.
|
|
This behavior differs from :py:func:`numpy.trace` which uses the first two
|
|
axes by default.
|
|
|
|
>>> a = np.arange(24).reshape((3, 2, 2, 2))
|
|
>>> np.linalg.trace(a).shape
|
|
(3, 2)
|
|
|
|
Traces adjacent to the main diagonal can be obtained by using the
|
|
`offset` argument:
|
|
|
|
>>> a = np.arange(9).reshape((3, 3)); a
|
|
array([[0, 1, 2],
|
|
[3, 4, 5],
|
|
[6, 7, 8]])
|
|
>>> np.linalg.trace(a, offset=1) # First superdiagonal
|
|
6
|
|
>>> np.linalg.trace(a, offset=2) # Second superdiagonal
|
|
2
|
|
>>> np.linalg.trace(a, offset=-1) # First subdiagonal
|
|
10
|
|
>>> np.linalg.trace(a, offset=-2) # Second subdiagonal
|
|
6
|
|
|
|
"""
|
|
return _core_trace(x, offset, axis1=-2, axis2=-1, dtype=dtype)
|
|
|
|
|
|
# cross
|
|
|
|
def _cross_dispatcher(x1, x2, /, *, axis=None):
|
|
return (x1, x2,)
|
|
|
|
|
|
@array_function_dispatch(_cross_dispatcher)
|
|
def cross(x1, x2, /, *, axis=-1):
|
|
"""
|
|
Returns the cross product of 3-element vectors.
|
|
|
|
If ``x1`` and/or ``x2`` are multi-dimensional arrays, then
|
|
the cross-product of each pair of corresponding 3-element vectors
|
|
is independently computed.
|
|
|
|
This function is Array API compatible, contrary to
|
|
:func:`numpy.cross`.
|
|
|
|
Parameters
|
|
----------
|
|
x1 : array_like
|
|
The first input array.
|
|
x2 : array_like
|
|
The second input array. Must be compatible with ``x1`` for all
|
|
non-compute axes. The size of the axis over which to compute
|
|
the cross-product must be the same size as the respective axis
|
|
in ``x1``.
|
|
axis : int, optional
|
|
The axis (dimension) of ``x1`` and ``x2`` containing the vectors for
|
|
which to compute the cross-product. Default: ``-1``.
|
|
|
|
Returns
|
|
-------
|
|
out : ndarray
|
|
An array containing the cross products.
|
|
|
|
See Also
|
|
--------
|
|
numpy.cross
|
|
|
|
Examples
|
|
--------
|
|
Vector cross-product.
|
|
|
|
>>> x = np.array([1, 2, 3])
|
|
>>> y = np.array([4, 5, 6])
|
|
>>> np.linalg.cross(x, y)
|
|
array([-3, 6, -3])
|
|
|
|
Multiple vector cross-products. Note that the direction of the cross
|
|
product vector is defined by the *right-hand rule*.
|
|
|
|
>>> x = np.array([[1,2,3], [4,5,6]])
|
|
>>> y = np.array([[4,5,6], [1,2,3]])
|
|
>>> np.linalg.cross(x, y)
|
|
array([[-3, 6, -3],
|
|
[ 3, -6, 3]])
|
|
|
|
>>> x = np.array([[1, 2], [3, 4], [5, 6]])
|
|
>>> y = np.array([[4, 5], [6, 1], [2, 3]])
|
|
>>> np.linalg.cross(x, y, axis=0)
|
|
array([[-24, 6],
|
|
[ 18, 24],
|
|
[-6, -18]])
|
|
|
|
"""
|
|
x1 = asanyarray(x1)
|
|
x2 = asanyarray(x2)
|
|
|
|
if x1.shape[axis] != 3 or x2.shape[axis] != 3:
|
|
raise ValueError(
|
|
"Both input arrays must be (arrays of) 3-dimensional vectors, "
|
|
f"but they are {x1.shape[axis]} and {x2.shape[axis]} "
|
|
"dimensional instead."
|
|
)
|
|
|
|
return _core_cross(x1, x2, axis=axis)
|
|
|
|
|
|
# matmul
|
|
|
|
def _matmul_dispatcher(x1, x2, /):
|
|
return (x1, x2)
|
|
|
|
|
|
@array_function_dispatch(_matmul_dispatcher)
|
|
def matmul(x1, x2, /):
|
|
"""
|
|
Computes the matrix product.
|
|
|
|
This function is Array API compatible, contrary to
|
|
:func:`numpy.matmul`.
|
|
|
|
Parameters
|
|
----------
|
|
x1 : array_like
|
|
The first input array.
|
|
x2 : array_like
|
|
The second input array.
|
|
|
|
Returns
|
|
-------
|
|
out : ndarray
|
|
The matrix product of the inputs.
|
|
This is a scalar only when both ``x1``, ``x2`` are 1-d vectors.
|
|
|
|
Raises
|
|
------
|
|
ValueError
|
|
If the last dimension of ``x1`` is not the same size as
|
|
the second-to-last dimension of ``x2``.
|
|
|
|
If a scalar value is passed in.
|
|
|
|
See Also
|
|
--------
|
|
numpy.matmul
|
|
|
|
Examples
|
|
--------
|
|
For 2-D arrays it is the matrix product:
|
|
|
|
>>> a = np.array([[1, 0],
|
|
... [0, 1]])
|
|
>>> b = np.array([[4, 1],
|
|
... [2, 2]])
|
|
>>> np.linalg.matmul(a, b)
|
|
array([[4, 1],
|
|
[2, 2]])
|
|
|
|
For 2-D mixed with 1-D, the result is the usual.
|
|
|
|
>>> a = np.array([[1, 0],
|
|
... [0, 1]])
|
|
>>> b = np.array([1, 2])
|
|
>>> np.linalg.matmul(a, b)
|
|
array([1, 2])
|
|
>>> np.linalg.matmul(b, a)
|
|
array([1, 2])
|
|
|
|
|
|
Broadcasting is conventional for stacks of arrays
|
|
|
|
>>> a = np.arange(2 * 2 * 4).reshape((2, 2, 4))
|
|
>>> b = np.arange(2 * 2 * 4).reshape((2, 4, 2))
|
|
>>> np.linalg.matmul(a,b).shape
|
|
(2, 2, 2)
|
|
>>> np.linalg.matmul(a, b)[0, 1, 1]
|
|
98
|
|
>>> sum(a[0, 1, :] * b[0 , :, 1])
|
|
98
|
|
|
|
Vector, vector returns the scalar inner product, but neither argument
|
|
is complex-conjugated:
|
|
|
|
>>> np.linalg.matmul([2j, 3j], [2j, 3j])
|
|
(-13+0j)
|
|
|
|
Scalar multiplication raises an error.
|
|
|
|
>>> np.linalg.matmul([1,2], 3)
|
|
Traceback (most recent call last):
|
|
...
|
|
ValueError: matmul: Input operand 1 does not have enough dimensions ...
|
|
|
|
"""
|
|
return _core_matmul(x1, x2)
|
|
|
|
|
|
# tensordot
|
|
|
|
def _tensordot_dispatcher(x1, x2, /, *, axes=None):
|
|
return (x1, x2)
|
|
|
|
|
|
@array_function_dispatch(_tensordot_dispatcher)
|
|
def tensordot(x1, x2, /, *, axes=2):
|
|
return _core_tensordot(x1, x2, axes=axes)
|
|
|
|
|
|
tensordot.__doc__ = _core_tensordot.__doc__
|
|
|
|
|
|
# matrix_transpose
|
|
|
|
def _matrix_transpose_dispatcher(x):
|
|
return (x,)
|
|
|
|
@array_function_dispatch(_matrix_transpose_dispatcher)
|
|
def matrix_transpose(x, /):
|
|
return _core_matrix_transpose(x)
|
|
|
|
|
|
matrix_transpose.__doc__ = _core_matrix_transpose.__doc__
|
|
|
|
|
|
# matrix_norm
|
|
|
|
def _matrix_norm_dispatcher(x, /, *, keepdims=None, ord=None):
|
|
return (x,)
|
|
|
|
@array_function_dispatch(_matrix_norm_dispatcher)
|
|
def matrix_norm(x, /, *, keepdims=False, ord="fro"):
|
|
"""
|
|
Computes the matrix norm of a matrix (or a stack of matrices) ``x``.
|
|
|
|
This function is Array API compatible.
|
|
|
|
Parameters
|
|
----------
|
|
x : array_like
|
|
Input array having shape (..., M, N) and whose two innermost
|
|
dimensions form ``MxN`` matrices.
|
|
keepdims : bool, optional
|
|
If this is set to True, the axes which are normed over are left in
|
|
the result as dimensions with size one. Default: False.
|
|
ord : {1, -1, 2, -2, inf, -inf, 'fro', 'nuc'}, optional
|
|
The order of the norm. For details see the table under ``Notes``
|
|
in `numpy.linalg.norm`.
|
|
|
|
See Also
|
|
--------
|
|
numpy.linalg.norm : Generic norm function
|
|
|
|
Examples
|
|
--------
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.arange(9) - 4
|
|
>>> a
|
|
array([-4, -3, -2, ..., 2, 3, 4])
|
|
>>> b = a.reshape((3, 3))
|
|
>>> b
|
|
array([[-4, -3, -2],
|
|
[-1, 0, 1],
|
|
[ 2, 3, 4]])
|
|
|
|
>>> LA.matrix_norm(b)
|
|
7.745966692414834
|
|
>>> LA.matrix_norm(b, ord='fro')
|
|
7.745966692414834
|
|
>>> LA.matrix_norm(b, ord=np.inf)
|
|
9.0
|
|
>>> LA.matrix_norm(b, ord=-np.inf)
|
|
2.0
|
|
|
|
>>> LA.matrix_norm(b, ord=1)
|
|
7.0
|
|
>>> LA.matrix_norm(b, ord=-1)
|
|
6.0
|
|
>>> LA.matrix_norm(b, ord=2)
|
|
7.3484692283495345
|
|
>>> LA.matrix_norm(b, ord=-2)
|
|
1.8570331885190563e-016 # may vary
|
|
|
|
"""
|
|
x = asanyarray(x)
|
|
return norm(x, axis=(-2, -1), keepdims=keepdims, ord=ord)
|
|
|
|
|
|
# vector_norm
|
|
|
|
def _vector_norm_dispatcher(x, /, *, axis=None, keepdims=None, ord=None):
|
|
return (x,)
|
|
|
|
@array_function_dispatch(_vector_norm_dispatcher)
|
|
def vector_norm(x, /, *, axis=None, keepdims=False, ord=2):
|
|
"""
|
|
Computes the vector norm of a vector (or batch of vectors) ``x``.
|
|
|
|
This function is Array API compatible.
|
|
|
|
Parameters
|
|
----------
|
|
x : array_like
|
|
Input array.
|
|
axis : {None, int, 2-tuple of ints}, optional
|
|
If an integer, ``axis`` specifies the axis (dimension) along which
|
|
to compute vector norms. If an n-tuple, ``axis`` specifies the axes
|
|
(dimensions) along which to compute batched vector norms. If ``None``,
|
|
the vector norm must be computed over all array values (i.e.,
|
|
equivalent to computing the vector norm of a flattened array).
|
|
Default: ``None``.
|
|
keepdims : bool, optional
|
|
If this is set to True, the axes which are normed over are left in
|
|
the result as dimensions with size one. Default: False.
|
|
ord : {1, -1, 2, -2, inf, -inf, 'fro', 'nuc'}, optional
|
|
The order of the norm. For details see the table under ``Notes``
|
|
in `numpy.linalg.norm`.
|
|
|
|
See Also
|
|
--------
|
|
numpy.linalg.norm : Generic norm function
|
|
|
|
Examples
|
|
--------
|
|
>>> from numpy import linalg as LA
|
|
>>> a = np.arange(9) + 1
|
|
>>> a
|
|
array([1, 2, 3, 4, 5, 6, 7, 8, 9])
|
|
>>> b = a.reshape((3, 3))
|
|
>>> b
|
|
array([[1, 2, 3],
|
|
[4, 5, 6],
|
|
[7, 8, 9]])
|
|
|
|
>>> LA.vector_norm(b)
|
|
16.881943016134134
|
|
>>> LA.vector_norm(b, ord=np.inf)
|
|
9.0
|
|
>>> LA.vector_norm(b, ord=-np.inf)
|
|
1.0
|
|
|
|
>>> LA.vector_norm(b, ord=1)
|
|
45.0
|
|
>>> LA.vector_norm(b, ord=-1)
|
|
0.3534857623790153
|
|
>>> LA.vector_norm(b, ord=2)
|
|
16.881943016134134
|
|
>>> LA.vector_norm(b, ord=-2)
|
|
0.8058837395885292
|
|
|
|
"""
|
|
x = asanyarray(x)
|
|
shape = list(x.shape)
|
|
if axis is None:
|
|
# Note: np.linalg.norm() doesn't handle 0-D arrays
|
|
x = x.ravel()
|
|
_axis = 0
|
|
elif isinstance(axis, tuple):
|
|
# Note: The axis argument supports any number of axes, whereas
|
|
# np.linalg.norm() only supports a single axis for vector norm.
|
|
normalized_axis = normalize_axis_tuple(axis, x.ndim)
|
|
rest = tuple(i for i in range(x.ndim) if i not in normalized_axis)
|
|
newshape = axis + rest
|
|
x = _core_transpose(x, newshape).reshape(
|
|
(
|
|
prod([x.shape[i] for i in axis], dtype=int),
|
|
*[x.shape[i] for i in rest]
|
|
)
|
|
)
|
|
_axis = 0
|
|
else:
|
|
_axis = axis
|
|
|
|
res = norm(x, axis=_axis, ord=ord)
|
|
|
|
if keepdims:
|
|
# We can't reuse np.linalg.norm(keepdims) because of the reshape hacks
|
|
# above to avoid matrix norm logic.
|
|
_axis = normalize_axis_tuple(
|
|
range(len(shape)) if axis is None else axis, len(shape)
|
|
)
|
|
for i in _axis:
|
|
shape[i] = 1
|
|
res = res.reshape(tuple(shape))
|
|
|
|
return res
|
|
|
|
|
|
# vecdot
|
|
|
|
def _vecdot_dispatcher(x1, x2, /, *, axis=None):
|
|
return (x1, x2)
|
|
|
|
@array_function_dispatch(_vecdot_dispatcher)
|
|
def vecdot(x1, x2, /, *, axis=-1):
|
|
"""
|
|
Computes the vector dot product.
|
|
|
|
This function is restricted to arguments compatible with the Array API,
|
|
contrary to :func:`numpy.vecdot`.
|
|
|
|
Let :math:`\\mathbf{a}` be a vector in ``x1`` and :math:`\\mathbf{b}` be
|
|
a corresponding vector in ``x2``. The dot product is defined as:
|
|
|
|
.. math::
|
|
\\mathbf{a} \\cdot \\mathbf{b} = \\sum_{i=0}^{n-1} \\overline{a_i}b_i
|
|
|
|
over the dimension specified by ``axis`` and where :math:`\\overline{a_i}`
|
|
denotes the complex conjugate if :math:`a_i` is complex and the identity
|
|
otherwise.
|
|
|
|
Parameters
|
|
----------
|
|
x1 : array_like
|
|
First input array.
|
|
x2 : array_like
|
|
Second input array.
|
|
axis : int, optional
|
|
Axis over which to compute the dot product. Default: ``-1``.
|
|
|
|
Returns
|
|
-------
|
|
output : ndarray
|
|
The vector dot product of the input.
|
|
|
|
See Also
|
|
--------
|
|
numpy.vecdot
|
|
|
|
Examples
|
|
--------
|
|
Get the projected size along a given normal for an array of vectors.
|
|
|
|
>>> v = np.array([[0., 5., 0.], [0., 0., 10.], [0., 6., 8.]])
|
|
>>> n = np.array([0., 0.6, 0.8])
|
|
>>> np.linalg.vecdot(v, n)
|
|
array([ 3., 8., 10.])
|
|
|
|
"""
|
|
return _core_vecdot(x1, x2, axis=axis)
|