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I have a 3x3 matrix, of which I compute inverse. The inverse can be written legibly only when some subexpressions are replaced by new symbols, because they appear multiple times. Can I have sympy try hard to find those subexpressions and replace them? I tried the following, without success:

from sympy import *

Ex, Ez, nuxy, nuxz = symbols('E_x E_z nu_xy nu_xz')

# compliance matrix for cross-anisotropic material
compl = Matrix([[1/Ex, -nuxy/Ex, -nuxz/Ez],
                [-nuxy/Ex, 1/Ex, -nuxz/Ez],
                [-nuxz/Ex, -nuxz/Ex, 1/Ez]])

# stiffness matrix
stiff = compl.inv()

# symbols I want to introduce 
m, e = symbols('m e')  

meSubs = {Ex/Ez: e, (1 - nuxy - 2*e*nuxz**2): m}  # instead of these subexpressions

# stiff.simplify() returns None, is that a bug? that's why I apply simplify together with subs here:
stiff.applyfunc(lambda x: simplify(x.subs(meSubs)))
print stiff

Using sympy 0.6.7 (I could upgrade, if needed).

EDIT:

I upgraded to 0.7.1-git (cf9c01f8f9b4b749a7f59891f546646e4b38e580 to be precise), and run (thanks to @PreludeAndFugue for suggestion):

from sympy import *
Ex,Ez,nuxy,nuxz,m=symbols('E_x E_z nu_xy nu_xz m')
compl=Matrix([[1/Ex,-nuxy/Ex,-nuxz/Ez],[-nuxy/Ex,1/Ex,-nuxz/Ez],[-nuxz/Ex,-nuxz/Ex,1/Ez]])
stiff=compl.inv()
stiff.simplify()
stiff.subs({-nuxy-2*nuxz**2+1:m})    # tried other rearrangements of the equality, as well, same result.
stiff.applyfunc(lambda x: together(expand(x)))
pprint(stiff)

obtaining

⎡              ⎛    2    ⎞                         ⎛            2⎞                              ⎤
⎢           Eₓ⋅⎝ν_xz  - 1⎠                     -Eₓ⋅⎝-ν_xy - ν_xz ⎠                 Eₓ⋅ν_xz      ⎥
⎢ ──────────────────────────────────   ────────────────────────────────────  ───────────────────⎥
⎢     2              2         2             2              2         2                    2    ⎥
⎢ ν_xy  + 2⋅ν_xy⋅ν_xz  + 2⋅ν_xz  - 1   - ν_xy  - 2⋅ν_xy⋅ν_xz  - 2⋅ν_xz  + 1  -ν_xy - 2⋅ν_xz  + 1⎥
⎢                                                                                               ⎥
⎢            ⎛            2⎞                         ⎛    2    ⎞                                ⎥
⎢        -Eₓ⋅⎝-ν_xy - ν_xz ⎠                      Eₓ⋅⎝ν_xz  - 1⎠                   Eₓ⋅ν_xz      ⎥
⎢────────────────────────────────────   ──────────────────────────────────   ───────────────────⎥
⎢      2              2         2           2              2         2                     2    ⎥
⎢- ν_xy  - 2⋅ν_xy⋅ν_xz  - 2⋅ν_xz  + 1   ν_xy  + 2⋅ν_xy⋅ν_xz  + 2⋅ν_xz  - 1   -ν_xy - 2⋅ν_xz  + 1⎥
⎢                                                                                               ⎥
⎢              E_z⋅ν_xz                              E_z⋅ν_xz                  E_z⋅(ν_xy - 1)   ⎥
⎢        ───────────────────                   ───────────────────           ────────────────── ⎥
⎢                      2                                     2                            2     ⎥
⎣        -ν_xy - 2⋅ν_xz  + 1                   -ν_xy - 2⋅ν_xz  + 1           ν_xy + 2⋅ν_xz  - 1 ⎦

Hm, so why does not get "-ν_xy - 2⋅ν_xz² + 1" replaced with m?

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Note that stiff.simplify() simplifies stiff inplace, so returns None. Compare with, for example, list.sort(). –  PreludeAndFugue Oct 28 '11 at 12:22
    
Sympy's pprint function can be used to print a prettified version. –  PreludeAndFugue Oct 28 '11 at 12:27
    
@PreludeAndFugue: thanks for the simplify() thing... could've checked. –  eudoxos Oct 28 '11 at 18:23
    
All the core developers are here: groups.google.com/group/sympy/topics. You should get good answers from them. –  PreludeAndFugue Oct 31 '11 at 22:08

2 Answers 2

I'm not sure if using 0.6.7 is a problem - but updating to 0.7.1 is recommended.

When I look at stiff, I can't see the subsitutions in meSubs being useful. After creating stiff, I did the following:

stiff.simplify()
stiff = stiff.subs({2*nuxz**2: 1 - nuxy - m})
stiff = stiff.applyfunc(lambda x: together(expand(x)))
pprint(stiff)

The output isn't too bad:

[      /     2    \        /             2\                  ]
[  E_x*\nu_xz  - 1/    E_x*\nu_xy + nu_xz /     E_x*nu_xz    ]
[  ----------------    --------------------     ---------    ]
[   m*(-nu_xy - 1)        m*(nu_xy + 1)             m        ]
[                                                            ]
[    /             2\        /     2    \                    ]
[E_x*\nu_xy + nu_xz /    E_x*\nu_xz  - 1/       E_x*nu_xz    ]
[--------------------    ----------------       ---------    ]
[   m*(nu_xy + 1)         m*(-nu_xy - 1)            m        ]
[                                                            ]
[     E_z*nu_xz             E_z*nu_xz        E_z*(-nu_xy + 1)]
[     ---------             ---------        ----------------]
[         m                     m                   m        ]

expand: http://docs.sympy.org/0.7.1/modules/core.html?highlight=expand#sympy.core.function.expand

together: http://docs.sympy.org/0.7.1/modules/polys/reference.html?highlight=together#sympy.polys.rationaltools.together

share|improve this answer
    
Yeah, the subs stuff above doesn't work that way in 0.6.7 (at least for me, probably because it doesn't recognize the nu in .subs() but does when making the symbol in the first place). Upgrading to 0.7.1 is a good idea regardless. –  VPeric Oct 30 '11 at 17:20
    
I tried with the latest git version, and put it as edit to the question. Perhaps is my machine cursed? –  eudoxos Oct 31 '11 at 10:07

It does get replaced, but subs does not work mutably on Matrices. applyfunc doesn't work mutably either, unfortunately. I get

In [10]: pprint(stiff.subs({-nuxy-2*nuxz**2+1:m}))
⎡               ⎛     2    ⎞                            ⎛              2⎞                            ⎤
⎢            Eₓ⋅⎝nu_xz  - 1⎠                        -Eₓ⋅⎝-nu_xy - nu_xz ⎠                Eₓ⋅nu_xz    ⎥
⎢ ──────────────────────────────────────   ────────────────────────────────────────      ────────    ⎥
⎢      2                2          2              2                2          2             m        ⎥
⎢ nu_xy  + 2⋅nu_xy⋅nu_xz  + 2⋅nu_xz  - 1   - nu_xy  - 2⋅nu_xy⋅nu_xz  - 2⋅nu_xz  + 1                  ⎥
⎢                                                                                                    ⎥
⎢             ⎛              2⎞                           ⎛     2    ⎞                               ⎥
⎢         -Eₓ⋅⎝-nu_xy - nu_xz ⎠                        Eₓ⋅⎝nu_xz  - 1⎠                   Eₓ⋅nu_xz    ⎥
⎢────────────────────────────────────────   ──────────────────────────────────────       ────────    ⎥
⎢       2                2          2            2                2          2              m        ⎥
⎢- nu_xy  - 2⋅nu_xy⋅nu_xz  - 2⋅nu_xz  + 1   nu_xy  + 2⋅nu_xy⋅nu_xz  + 2⋅nu_xz  - 1                   ⎥
⎢                                                                                                    ⎥
⎢               E_z⋅nu_xz                                 E_z⋅nu_xz                  -E_z⋅(nu_xy - 1)⎥
⎢               ─────────                                 ─────────                  ────────────────⎥
⎣                   m                                         m                             m        ⎦

There are plans to make Matrix immutable by default, and then make MutableMatrix work completely in place on all operations. See https://code.google.com/p/sympy/issues/detail?id=3410. But it hasn't happened yet.

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