You cannot select more than 25 topics
Topics must start with a letter or number, can include dashes ('-') and can be up to 35 characters long.
192 lines
5.5 KiB
Python
192 lines
5.5 KiB
Python
"""
|
|
Matrix square root for general matrices and for upper triangular matrices.
|
|
|
|
This module exists to avoid cyclic imports.
|
|
|
|
"""
|
|
__all__ = ['sqrtm']
|
|
|
|
import numpy as np
|
|
|
|
from scipy._lib._util import _asarray_validated
|
|
|
|
|
|
# Local imports
|
|
from .misc import norm
|
|
from .lapack import ztrsyl, dtrsyl
|
|
from .decomp_schur import schur, rsf2csf
|
|
|
|
|
|
class SqrtmError(np.linalg.LinAlgError):
|
|
pass
|
|
|
|
|
|
from ._matfuncs_sqrtm_triu import within_block_loop
|
|
|
|
|
|
def _sqrtm_triu(T, blocksize=64):
|
|
"""
|
|
Matrix square root of an upper triangular matrix.
|
|
|
|
This is a helper function for `sqrtm` and `logm`.
|
|
|
|
Parameters
|
|
----------
|
|
T : (N, N) array_like upper triangular
|
|
Matrix whose square root to evaluate
|
|
blocksize : int, optional
|
|
If the blocksize is not degenerate with respect to the
|
|
size of the input array, then use a blocked algorithm. (Default: 64)
|
|
|
|
Returns
|
|
-------
|
|
sqrtm : (N, N) ndarray
|
|
Value of the sqrt function at `T`
|
|
|
|
References
|
|
----------
|
|
.. [1] Edvin Deadman, Nicholas J. Higham, Rui Ralha (2013)
|
|
"Blocked Schur Algorithms for Computing the Matrix Square Root,
|
|
Lecture Notes in Computer Science, 7782. pp. 171-182.
|
|
|
|
"""
|
|
T_diag = np.diag(T)
|
|
keep_it_real = np.isrealobj(T) and np.min(T_diag) >= 0
|
|
|
|
# Cast to complex as necessary + ensure double precision
|
|
if not keep_it_real:
|
|
T = np.asarray(T, dtype=np.complex128, order="C")
|
|
T_diag = np.asarray(T_diag, dtype=np.complex128)
|
|
else:
|
|
T = np.asarray(T, dtype=np.float64, order="C")
|
|
T_diag = np.asarray(T_diag, dtype=np.float64)
|
|
|
|
R = np.diag(np.sqrt(T_diag))
|
|
|
|
# Compute the number of blocks to use; use at least one block.
|
|
n, n = T.shape
|
|
nblocks = max(n // blocksize, 1)
|
|
|
|
# Compute the smaller of the two sizes of blocks that
|
|
# we will actually use, and compute the number of large blocks.
|
|
bsmall, nlarge = divmod(n, nblocks)
|
|
blarge = bsmall + 1
|
|
nsmall = nblocks - nlarge
|
|
if nsmall * bsmall + nlarge * blarge != n:
|
|
raise Exception('internal inconsistency')
|
|
|
|
# Define the index range covered by each block.
|
|
start_stop_pairs = []
|
|
start = 0
|
|
for count, size in ((nsmall, bsmall), (nlarge, blarge)):
|
|
for i in range(count):
|
|
start_stop_pairs.append((start, start + size))
|
|
start += size
|
|
|
|
# Within-block interactions (Cythonized)
|
|
within_block_loop(R, T, start_stop_pairs, nblocks)
|
|
|
|
# Between-block interactions (Cython would give no significant speedup)
|
|
for j in range(nblocks):
|
|
jstart, jstop = start_stop_pairs[j]
|
|
for i in range(j-1, -1, -1):
|
|
istart, istop = start_stop_pairs[i]
|
|
S = T[istart:istop, jstart:jstop]
|
|
if j - i > 1:
|
|
S = S - R[istart:istop, istop:jstart].dot(R[istop:jstart,
|
|
jstart:jstop])
|
|
|
|
# Invoke LAPACK.
|
|
# For more details, see the solve_sylvester implemention
|
|
# and the fortran dtrsyl and ztrsyl docs.
|
|
Rii = R[istart:istop, istart:istop]
|
|
Rjj = R[jstart:jstop, jstart:jstop]
|
|
if keep_it_real:
|
|
x, scale, info = dtrsyl(Rii, Rjj, S)
|
|
else:
|
|
x, scale, info = ztrsyl(Rii, Rjj, S)
|
|
R[istart:istop, jstart:jstop] = x * scale
|
|
|
|
# Return the matrix square root.
|
|
return R
|
|
|
|
|
|
def sqrtm(A, disp=True, blocksize=64):
|
|
"""
|
|
Matrix square root.
|
|
|
|
Parameters
|
|
----------
|
|
A : (N, N) array_like
|
|
Matrix whose square root to evaluate
|
|
disp : bool, optional
|
|
Print warning if error in the result is estimated large
|
|
instead of returning estimated error. (Default: True)
|
|
blocksize : integer, optional
|
|
If the blocksize is not degenerate with respect to the
|
|
size of the input array, then use a blocked algorithm. (Default: 64)
|
|
|
|
Returns
|
|
-------
|
|
sqrtm : (N, N) ndarray
|
|
Value of the sqrt function at `A`
|
|
|
|
errest : float
|
|
(if disp == False)
|
|
|
|
Frobenius norm of the estimated error, ||err||_F / ||A||_F
|
|
|
|
References
|
|
----------
|
|
.. [1] Edvin Deadman, Nicholas J. Higham, Rui Ralha (2013)
|
|
"Blocked Schur Algorithms for Computing the Matrix Square Root,
|
|
Lecture Notes in Computer Science, 7782. pp. 171-182.
|
|
|
|
Examples
|
|
--------
|
|
>>> from scipy.linalg import sqrtm
|
|
>>> a = np.array([[1.0, 3.0], [1.0, 4.0]])
|
|
>>> r = sqrtm(a)
|
|
>>> r
|
|
array([[ 0.75592895, 1.13389342],
|
|
[ 0.37796447, 1.88982237]])
|
|
>>> r.dot(r)
|
|
array([[ 1., 3.],
|
|
[ 1., 4.]])
|
|
|
|
"""
|
|
A = _asarray_validated(A, check_finite=True, as_inexact=True)
|
|
if len(A.shape) != 2:
|
|
raise ValueError("Non-matrix input to matrix function.")
|
|
if blocksize < 1:
|
|
raise ValueError("The blocksize should be at least 1.")
|
|
keep_it_real = np.isrealobj(A)
|
|
if keep_it_real:
|
|
T, Z = schur(A)
|
|
if not np.array_equal(T, np.triu(T)):
|
|
T, Z = rsf2csf(T, Z)
|
|
else:
|
|
T, Z = schur(A, output='complex')
|
|
failflag = False
|
|
try:
|
|
R = _sqrtm_triu(T, blocksize=blocksize)
|
|
ZH = np.conjugate(Z).T
|
|
X = Z.dot(R).dot(ZH)
|
|
except SqrtmError:
|
|
failflag = True
|
|
X = np.empty_like(A)
|
|
X.fill(np.nan)
|
|
|
|
if disp:
|
|
if failflag:
|
|
print("Failed to find a square root.")
|
|
return X
|
|
else:
|
|
try:
|
|
arg2 = norm(X.dot(X) - A, 'fro')**2 / norm(A, 'fro')
|
|
except ValueError:
|
|
# NaNs in matrix
|
|
arg2 = np.inf
|
|
|
|
return X, arg2
|