# List/matrix of coefficients equation (system of equations)

I try to extract coefficient from equations (system of equations) into list (matrix). I have tried `CoefficientList[poly, {var1, var2, ...}]` but without success.

This simple example should explain my problem:

``````Eq1 = a D[U[x1, x2], {x1, 2}] + b D[V[x1, x2], {x2, 2}]
``````

Edit:

Daniel's Lichtblau solution is very clear (thanks you), but what if the equation that looks like this?

``````Eq1 = a D[U[x1, x2], {x1, 2}] + b D[V[x1, x2], {x2, 2}] + c W[x1, x2]
``````

A simple example can be resolved as follows:

Is there any more elegant solution? (particularly for more complex expressions)

Ps I can't understand why, but this solution gives me the correct result.

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What if you state `CoefficientList[Eq1, {V^(0,2)[x1,x2], U^(2,0)[x1, x2]}]`? –  vissi Mar 2 '11 at 1:00
How about `CoefficientList[ a D[U[x1, x2], {x1, 2}] + b D[V[x1, x2], {x2, 2}], { D[U[x1, x2], {x1, 2}], D[V[x1, x2], {x2, 2}]}]` –  Yaroslav Bulatov Mar 2 '11 at 1:32

Firstly the partial derivatives are represented with `Derivative`, so the pattern needs to match that. Also, I don't think you want to use `CoefficientList` as that would accept terms where both your expressions appear. All in all, the following should work:

``````In[7]:= (Coefficient[Eq1, #] &) /@ {Derivative[2, 0][U][x1, x2], Derivative[0, 2][V][x1, x2]}
Out[7]= {a, b}
``````

Here `(Coefficient[Eq1, #] &)` is an anonymous function that finds the coefficient of the argument, and `/@` maps it to the list on the right.

HTH

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Thanks. This is exactly what I need. –  kros Mar 2 '11 at 9:14

CoefficientArrays is often useful for extracting coefficients to linear systems in some set of variables. In this case we first need to get the list of variables.

``````dvars = Cases[Eq1, Derivative[__][_][__], -1];
``````

CoefficientArrays returns a result of the form {constants, coefficients}. it uses sparse arrays so I'll convert to explicit lists with Normal.

``````Normal[CoefficientArrays[Eq1, dvars]]
``````

Out[672]= {0, {b, a}}

Daniel Lichtblau Wolfram Research

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Excellent. Thanks you. I've updated the question. I would be very grateful if you could look at it. –  kros Mar 2 '11 at 19:16