ai-content-maker/.venv/Lib/site-packages/mpmath/matrices/calculus.py

532 lines
18 KiB
Python

from ..libmp.backend import xrange
# TODO: should use diagonalization-based algorithms
class MatrixCalculusMethods(object):
def _exp_pade(ctx, a):
"""
Exponential of a matrix using Pade approximants.
See G. H. Golub, C. F. van Loan 'Matrix Computations',
third Ed., page 572
TODO:
- find a good estimate for q
- reduce the number of matrix multiplications to improve
performance
"""
def eps_pade(p):
return ctx.mpf(2)**(3-2*p) * \
ctx.factorial(p)**2/(ctx.factorial(2*p)**2 * (2*p + 1))
q = 4
extraq = 8
while 1:
if eps_pade(q) < ctx.eps:
break
q += 1
q += extraq
j = int(max(1, ctx.mag(ctx.mnorm(a,'inf'))))
extra = q
prec = ctx.prec
ctx.dps += extra + 3
try:
a = a/2**j
na = a.rows
den = ctx.eye(na)
num = ctx.eye(na)
x = ctx.eye(na)
c = ctx.mpf(1)
for k in range(1, q+1):
c *= ctx.mpf(q - k + 1)/((2*q - k + 1) * k)
x = a*x
cx = c*x
num += cx
den += (-1)**k * cx
f = ctx.lu_solve_mat(den, num)
for k in range(j):
f = f*f
finally:
ctx.prec = prec
return f*1
def expm(ctx, A, method='taylor'):
r"""
Computes the matrix exponential of a square matrix `A`, which is defined
by the power series
.. math ::
\exp(A) = I + A + \frac{A^2}{2!} + \frac{A^3}{3!} + \ldots
With method='taylor', the matrix exponential is computed
using the Taylor series. With method='pade', Pade approximants
are used instead.
**Examples**
Basic examples::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> expm(zeros(3))
[1.0 0.0 0.0]
[0.0 1.0 0.0]
[0.0 0.0 1.0]
>>> expm(eye(3))
[2.71828182845905 0.0 0.0]
[ 0.0 2.71828182845905 0.0]
[ 0.0 0.0 2.71828182845905]
>>> expm([[1,1,0],[1,0,1],[0,1,0]])
[ 3.86814500615414 2.26812870852145 0.841130841230196]
[ 2.26812870852145 2.44114713886289 1.42699786729125]
[0.841130841230196 1.42699786729125 1.6000162976327]
>>> expm([[1,1,0],[1,0,1],[0,1,0]], method='pade')
[ 3.86814500615414 2.26812870852145 0.841130841230196]
[ 2.26812870852145 2.44114713886289 1.42699786729125]
[0.841130841230196 1.42699786729125 1.6000162976327]
>>> expm([[1+j, 0], [1+j,1]])
[(1.46869393991589 + 2.28735528717884j) 0.0]
[ (1.03776739863568 + 3.536943175722j) (2.71828182845905 + 0.0j)]
Matrices with large entries are allowed::
>>> expm(matrix([[1,2],[2,3]])**25)
[5.65024064048415e+2050488462815550 9.14228140091932e+2050488462815550]
[9.14228140091932e+2050488462815550 1.47925220414035e+2050488462815551]
The identity `\exp(A+B) = \exp(A) \exp(B)` does not hold for
noncommuting matrices::
>>> A = hilbert(3)
>>> B = A + eye(3)
>>> chop(mnorm(A*B - B*A))
0.0
>>> chop(mnorm(expm(A+B) - expm(A)*expm(B)))
0.0
>>> B = A + ones(3)
>>> mnorm(A*B - B*A)
1.8
>>> mnorm(expm(A+B) - expm(A)*expm(B))
42.0927851137247
"""
if method == 'pade':
prec = ctx.prec
try:
A = ctx.matrix(A)
ctx.prec += 2*A.rows
res = ctx._exp_pade(A)
finally:
ctx.prec = prec
return res
A = ctx.matrix(A)
prec = ctx.prec
j = int(max(1, ctx.mag(ctx.mnorm(A,'inf'))))
j += int(0.5*prec**0.5)
try:
ctx.prec += 10 + 2*j
tol = +ctx.eps
A = A/2**j
T = A
Y = A**0 + A
k = 2
while 1:
T *= A * (1/ctx.mpf(k))
if ctx.mnorm(T, 'inf') < tol:
break
Y += T
k += 1
for k in xrange(j):
Y = Y*Y
finally:
ctx.prec = prec
Y *= 1
return Y
def cosm(ctx, A):
r"""
Gives the cosine of a square matrix `A`, defined in analogy
with the matrix exponential.
Examples::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> X = eye(3)
>>> cosm(X)
[0.54030230586814 0.0 0.0]
[ 0.0 0.54030230586814 0.0]
[ 0.0 0.0 0.54030230586814]
>>> X = hilbert(3)
>>> cosm(X)
[ 0.424403834569555 -0.316643413047167 -0.221474945949293]
[-0.316643413047167 0.820646708837824 -0.127183694770039]
[-0.221474945949293 -0.127183694770039 0.909236687217541]
>>> X = matrix([[1+j,-2],[0,-j]])
>>> cosm(X)
[(0.833730025131149 - 0.988897705762865j) (1.07485840848393 - 0.17192140544213j)]
[ 0.0 (1.54308063481524 + 0.0j)]
"""
B = 0.5 * (ctx.expm(A*ctx.j) + ctx.expm(A*(-ctx.j)))
if not sum(A.apply(ctx.im).apply(abs)):
B = B.apply(ctx.re)
return B
def sinm(ctx, A):
r"""
Gives the sine of a square matrix `A`, defined in analogy
with the matrix exponential.
Examples::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> X = eye(3)
>>> sinm(X)
[0.841470984807897 0.0 0.0]
[ 0.0 0.841470984807897 0.0]
[ 0.0 0.0 0.841470984807897]
>>> X = hilbert(3)
>>> sinm(X)
[0.711608512150994 0.339783913247439 0.220742837314741]
[0.339783913247439 0.244113865695532 0.187231271174372]
[0.220742837314741 0.187231271174372 0.155816730769635]
>>> X = matrix([[1+j,-2],[0,-j]])
>>> sinm(X)
[(1.29845758141598 + 0.634963914784736j) (-1.96751511930922 + 0.314700021761367j)]
[ 0.0 (0.0 - 1.1752011936438j)]
"""
B = (-0.5j) * (ctx.expm(A*ctx.j) - ctx.expm(A*(-ctx.j)))
if not sum(A.apply(ctx.im).apply(abs)):
B = B.apply(ctx.re)
return B
def _sqrtm_rot(ctx, A, _may_rotate):
# If the iteration fails to converge, cheat by performing
# a rotation by a complex number
u = ctx.j**0.3
return ctx.sqrtm(u*A, _may_rotate) / ctx.sqrt(u)
def sqrtm(ctx, A, _may_rotate=2):
r"""
Computes a square root of the square matrix `A`, i.e. returns
a matrix `B = A^{1/2}` such that `B^2 = A`. The square root
of a matrix, if it exists, is not unique.
**Examples**
Square roots of some simple matrices::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> sqrtm([[1,0], [0,1]])
[1.0 0.0]
[0.0 1.0]
>>> sqrtm([[0,0], [0,0]])
[0.0 0.0]
[0.0 0.0]
>>> sqrtm([[2,0],[0,1]])
[1.4142135623731 0.0]
[ 0.0 1.0]
>>> sqrtm([[1,1],[1,0]])
[ (0.920442065259926 - 0.21728689675164j) (0.568864481005783 + 0.351577584254143j)]
[(0.568864481005783 + 0.351577584254143j) (0.351577584254143 - 0.568864481005783j)]
>>> sqrtm([[1,0],[0,1]])
[1.0 0.0]
[0.0 1.0]
>>> sqrtm([[-1,0],[0,1]])
[(0.0 - 1.0j) 0.0]
[ 0.0 (1.0 + 0.0j)]
>>> sqrtm([[j,0],[0,j]])
[(0.707106781186547 + 0.707106781186547j) 0.0]
[ 0.0 (0.707106781186547 + 0.707106781186547j)]
A square root of a rotation matrix, giving the corresponding
half-angle rotation matrix::
>>> t1 = 0.75
>>> t2 = t1 * 0.5
>>> A1 = matrix([[cos(t1), -sin(t1)], [sin(t1), cos(t1)]])
>>> A2 = matrix([[cos(t2), -sin(t2)], [sin(t2), cos(t2)]])
>>> sqrtm(A1)
[0.930507621912314 -0.366272529086048]
[0.366272529086048 0.930507621912314]
>>> A2
[0.930507621912314 -0.366272529086048]
[0.366272529086048 0.930507621912314]
The identity `(A^2)^{1/2} = A` does not necessarily hold::
>>> A = matrix([[4,1,4],[7,8,9],[10,2,11]])
>>> sqrtm(A**2)
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
>>> sqrtm(A)**2
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
>>> A = matrix([[-4,1,4],[7,-8,9],[10,2,11]])
>>> sqrtm(A**2)
[ 7.43715112194995 -0.324127569985474 1.8481718827526]
[-0.251549715716942 9.32699765900402 2.48221180985147]
[ 4.11609388833616 0.775751877098258 13.017955697342]
>>> chop(sqrtm(A)**2)
[-4.0 1.0 4.0]
[ 7.0 -8.0 9.0]
[10.0 2.0 11.0]
For some matrices, a square root does not exist::
>>> sqrtm([[0,1], [0,0]])
Traceback (most recent call last):
...
ZeroDivisionError: matrix is numerically singular
Two examples from the documentation for Matlab's ``sqrtm``::
>>> mp.dps = 15; mp.pretty = True
>>> sqrtm([[7,10],[15,22]])
[1.56669890360128 1.74077655955698]
[2.61116483933547 4.17786374293675]
>>>
>>> X = matrix(\
... [[5,-4,1,0,0],
... [-4,6,-4,1,0],
... [1,-4,6,-4,1],
... [0,1,-4,6,-4],
... [0,0,1,-4,5]])
>>> Y = matrix(\
... [[2,-1,-0,-0,-0],
... [-1,2,-1,0,-0],
... [0,-1,2,-1,0],
... [-0,0,-1,2,-1],
... [-0,-0,-0,-1,2]])
>>> mnorm(sqrtm(X) - Y)
4.53155328326114e-19
"""
A = ctx.matrix(A)
# Trivial
if A*0 == A:
return A
prec = ctx.prec
if _may_rotate:
d = ctx.det(A)
if abs(ctx.im(d)) < 16*ctx.eps and ctx.re(d) < 0:
return ctx._sqrtm_rot(A, _may_rotate-1)
try:
ctx.prec += 10
tol = ctx.eps * 128
Y = A
Z = I = A**0
k = 0
# Denman-Beavers iteration
while 1:
Yprev = Y
try:
Y, Z = 0.5*(Y+ctx.inverse(Z)), 0.5*(Z+ctx.inverse(Y))
except ZeroDivisionError:
if _may_rotate:
Y = ctx._sqrtm_rot(A, _may_rotate-1)
break
else:
raise
mag1 = ctx.mnorm(Y-Yprev, 'inf')
mag2 = ctx.mnorm(Y, 'inf')
if mag1 <= mag2*tol:
break
if _may_rotate and k > 6 and not mag1 < mag2 * 0.001:
return ctx._sqrtm_rot(A, _may_rotate-1)
k += 1
if k > ctx.prec:
raise ctx.NoConvergence
finally:
ctx.prec = prec
Y *= 1
return Y
def logm(ctx, A):
r"""
Computes a logarithm of the square matrix `A`, i.e. returns
a matrix `B = \log(A)` such that `\exp(B) = A`. The logarithm
of a matrix, if it exists, is not unique.
**Examples**
Logarithms of some simple matrices::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> X = eye(3)
>>> logm(X)
[0.0 0.0 0.0]
[0.0 0.0 0.0]
[0.0 0.0 0.0]
>>> logm(2*X)
[0.693147180559945 0.0 0.0]
[ 0.0 0.693147180559945 0.0]
[ 0.0 0.0 0.693147180559945]
>>> logm(expm(X))
[1.0 0.0 0.0]
[0.0 1.0 0.0]
[0.0 0.0 1.0]
A logarithm of a complex matrix::
>>> X = matrix([[2+j, 1, 3], [1-j, 1-2*j, 1], [-4, -5, j]])
>>> B = logm(X)
>>> nprint(B)
[ (0.808757 + 0.107759j) (2.20752 + 0.202762j) (1.07376 - 0.773874j)]
[ (0.905709 - 0.107795j) (0.0287395 - 0.824993j) (0.111619 + 0.514272j)]
[(-0.930151 + 0.399512j) (-2.06266 - 0.674397j) (0.791552 + 0.519839j)]
>>> chop(expm(B))
[(2.0 + 1.0j) 1.0 3.0]
[(1.0 - 1.0j) (1.0 - 2.0j) 1.0]
[ -4.0 -5.0 (0.0 + 1.0j)]
A matrix `X` close to the identity matrix, for which
`\log(\exp(X)) = \exp(\log(X)) = X` holds::
>>> X = eye(3) + hilbert(3)/4
>>> X
[ 1.25 0.125 0.0833333333333333]
[ 0.125 1.08333333333333 0.0625]
[0.0833333333333333 0.0625 1.05]
>>> logm(expm(X))
[ 1.25 0.125 0.0833333333333333]
[ 0.125 1.08333333333333 0.0625]
[0.0833333333333333 0.0625 1.05]
>>> expm(logm(X))
[ 1.25 0.125 0.0833333333333333]
[ 0.125 1.08333333333333 0.0625]
[0.0833333333333333 0.0625 1.05]
A logarithm of a rotation matrix, giving back the angle of
the rotation::
>>> t = 3.7
>>> A = matrix([[cos(t),sin(t)],[-sin(t),cos(t)]])
>>> chop(logm(A))
[ 0.0 -2.58318530717959]
[2.58318530717959 0.0]
>>> (2*pi-t)
2.58318530717959
For some matrices, a logarithm does not exist::
>>> logm([[1,0], [0,0]])
Traceback (most recent call last):
...
ZeroDivisionError: matrix is numerically singular
Logarithm of a matrix with large entries::
>>> logm(hilbert(3) * 10**20).apply(re)
[ 45.5597513593433 1.27721006042799 0.317662687717978]
[ 1.27721006042799 42.5222778973542 2.24003708791604]
[0.317662687717978 2.24003708791604 42.395212822267]
"""
A = ctx.matrix(A)
prec = ctx.prec
try:
ctx.prec += 10
tol = ctx.eps * 128
I = A**0
B = A
n = 0
while 1:
B = ctx.sqrtm(B)
n += 1
if ctx.mnorm(B-I, 'inf') < 0.125:
break
T = X = B-I
L = X*0
k = 1
while 1:
if k & 1:
L += T / k
else:
L -= T / k
T *= X
if ctx.mnorm(T, 'inf') < tol:
break
k += 1
if k > ctx.prec:
raise ctx.NoConvergence
finally:
ctx.prec = prec
L *= 2**n
return L
def powm(ctx, A, r):
r"""
Computes `A^r = \exp(A \log r)` for a matrix `A` and complex
number `r`.
**Examples**
Powers and inverse powers of a matrix::
>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> A = matrix([[4,1,4],[7,8,9],[10,2,11]])
>>> powm(A, 2)
[ 63.0 20.0 69.0]
[174.0 89.0 199.0]
[164.0 48.0 179.0]
>>> chop(powm(powm(A, 4), 1/4.))
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
>>> powm(extraprec(20)(powm)(A, -4), -1/4.)
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
>>> chop(powm(powm(A, 1+0.5j), 1/(1+0.5j)))
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
>>> powm(extraprec(5)(powm)(A, -1.5), -1/(1.5))
[ 4.0 1.0 4.0]
[ 7.0 8.0 9.0]
[10.0 2.0 11.0]
A Fibonacci-generating matrix::
>>> powm([[1,1],[1,0]], 10)
[89.0 55.0]
[55.0 34.0]
>>> fib(10)
55.0
>>> powm([[1,1],[1,0]], 6.5)
[(16.5166626964253 - 0.0121089837381789j) (10.2078589271083 + 0.0195927472575932j)]
[(10.2078589271083 + 0.0195927472575932j) (6.30880376931698 - 0.0317017309957721j)]
>>> (phi**6.5 - (1-phi)**6.5)/sqrt(5)
(10.2078589271083 - 0.0195927472575932j)
>>> powm([[1,1],[1,0]], 6.2)
[ (14.3076953002666 - 0.008222855781077j) (8.81733464837593 + 0.0133048601383712j)]
[(8.81733464837593 + 0.0133048601383712j) (5.49036065189071 - 0.0215277159194482j)]
>>> (phi**6.2 - (1-phi)**6.2)/sqrt(5)
(8.81733464837593 - 0.0133048601383712j)
"""
A = ctx.matrix(A)
r = ctx.convert(r)
prec = ctx.prec
try:
ctx.prec += 10
if ctx.isint(r):
v = A ** int(r)
elif ctx.isint(r*2):
y = int(r*2)
v = ctx.sqrtm(A) ** y
else:
v = ctx.expm(r*ctx.logm(A))
finally:
ctx.prec = prec
v *= 1
return v