Vectorizing matrix multiplication in matlab

I would like to transform the matrix product AX-XB into vector form.

That is `Cx` where `x=vec(X)`

Yet I found the last term `(XB)` is very difficult to vectorize, it would be very sparsy.

Any effective way to do this?

Please see this link for the transformation to vector form

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What is `vec`? What do you mean by this question? `A*X-X*B` is already vectorized? –  Dan Apr 30 '13 at 6:16
vec is the vectorizing operation, just like flattening a matrix into vector. Details can be found in this wiki link en.wikipedia.org/wiki/Vectorization_%28mathematics%29 –  Rein Apr 30 '13 at 6:28
@Rein: Do you need to find `C`? Do you need to find `Cx` as vector? You know that `xVec = x(:)`, right? –  Jonas Apr 30 '13 at 6:39
Yes I need to find such a C –  Rein Apr 30 '13 at 7:15
Guess it is related to the Kronecker product function "kron" but it seems to be memory expensive. –  Rein Apr 30 '13 at 7:16

If you don't need `C` explicitly - like for iterative solvers - you can define an abstract linear operator that returns the vectorized product `C*x`. Not sure, if there is such a particular function in Matlab as SciPy's `LinearOperator`, but an anonymous function should do as well:

``````C_x = @(X) vec(A*X-X*B);
``````

where `vec` 'vectorises' the matrix, e.g. via `X(:)` as @Jonas has pointed out.

EDIT: A closed form was suggested by @Eitan T below!!

See Matlab Help for how to use anonymous functions and function handles.

The formula for the explicit `C` is given here.

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But what is `vec` here? Is it from the file exchange? Matlab has no such function `vec` –  Dan Apr 30 '13 at 8:22
I thought it has... Let me put this right in my answer. –  Jan Apr 30 '13 at 8:26
@Jan Actually, you can implement `vec(x)` as `reshape(x, [], 1)`, which is equivalent to `x(:)`, so: `C_x = @(X)reshape(A*X-X*B, [], 1)` –  Eitan T Apr 30 '13 at 8:49
Thanks! I haven't used matlab for quite a time... –  Jan Apr 30 '13 at 9:05