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Does Eigen have efficient type for store dense, fixed-size, symmetric matrix? (hey, they are ubiquitous!)

I.e. for N=9, it should store only (1+9)*9/2==45 elements and it has appropriate operations. For instance there should be efficient addition of two symmetric matrices, which returns simmilar symmetric matrix.

If there is no such thing, which actions (looks like this) I should make to introduce such type to Eigen? Does it has concepts of "Views"? Can I write something like "matrix view" for my own type, which would make it Eigen-friednly?

P.S. Probably I can treat plain array as 1xN matrix using map, and do operations on it. But it is not the cleanest solution.

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There is little advantage for N=9, due to the divergence in your code coming from resolving the matrix values. You are having your memory, but are you really running out of memory or do you expect some associated computational advantage? Can you motivate your question with some usage scenario? – Mikhail Nov 15 '12 at 20:50
"Can you motivate your question with some usage scenario?" - I have millions of such matrices. I need to store them in array, and do some operations on them. – qble Nov 15 '12 at 22:01
How many matrixes you can store in about 4GB of memory. Assuming doubles you can store 10 million, if we do it your way you can store 20 million. Imagine that these represents an square image. By using your inefficient matrixes, you were unable to double the length, but your computation time tripled. Differences of 2x memory capacity can be solved with ram modules. Its cheap to get 16 GB of ram, its much harder to double CPU performance. Focus on changing your model or buying new hardware. Respectfully ~ – Mikhail Nov 15 '12 at 22:18
@Mikhail, do you think I should recommend to all of my clients to buy additional memory? It is nonsense. And why you are telling that such matricies are inefficient? Addition of them should be pretty efficient. – qble Nov 15 '12 at 22:31
@Mikhail: Memory might be cheap, but bandwidth isn't. Depending on what the OP is planning to do with those matrices, the reduction in cache misses might improve the performance much more then the overhead from using the compressed storage form (if it exists, depending on the operations) would decrease it. – Grizzly Nov 16 '12 at 16:54

Yes, eigen3 has the concept of views. It doesn't do anything to the storage though. Just as an idea though, you might be able to share a larger block for two symmetric matrices of the same type:

Matrix<float,4,4> A1, A2; // assume A1 and A2 to be symmetric
Matrix<float,5,4> A;
A.topRightCorner<4,4>().triangularView<Upper>() = A1;
A.bottomLeftCorner<4,4>().triangularView<Lower>() = A2;

Its pretty cumbersome though, and I would only use it if your memory is really precious.

EDIT: updated based on the good comments below.

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Shouldn't it be A.topRightCorner<N,N>().triangularView<Upper>()? – Stefano M Nov 15 '12 at 22:03
"Matrix<float,5,5> A;" I think it would be more efficient to use Matrix<float,5,4> A; or Matrix<float,4,5> A; for store two 4x4 matrices. It is good point, but unfortunatly my matrices are separate entities, and can't be stored together. – qble Nov 15 '12 at 22:07
The link is broken. – Ruslan Dec 1 '15 at 12:02

Packed storage of symmetric matrices is a big enemy of vectorized code, i.e. of speed. Standard practice is to store the relevant N*(N+1)/2 coefficients in the upper or lower triangular part of a full dense NxN matrix and leave the remaining (N-1)*N/2 unreferenced. All operations on the symmetric matrix are then defined by taking into account this peculiar storage. In eigen you have the concept of triangular and self-adjoint views for obtaining this.

From the eigen reference: (for real matrices selfadjoint==symmetric).

Just as for triangular matrix, you can reference any triangular part of a square matrix to see it as a selfadjoint matrix and perform special and optimized operations. Again the opposite triangular part is never referenced and can be used to store other information.

Unless memory is a big problem, I would suggest to leave the unreferenced part of the matrix empty. (More readable code, no performance problems.)

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"Packed storage of symmetric matrices is a big enemy of vectorized code, i.e. of speed" - for my case, I need just to add such matrices, I don't see how it can affect vectorization in such case. "Unless memory is a big problem" - memory is a real problem - I have millions of such matrices.. – qble Nov 15 '12 at 22:03
If you do not perform any 'real' matrix operation like rank1 or rank2 update, LLT factorization and so on, I would simply go for a single BIG 2D array in which you store the matrix upper triangular part as N*(N+1)/2 columns (and of course assuring that you have column-major order). Then you can access the columns of this matrix and perform sum and scale operations efficiently. Accessing the i,j matrix element is then simply a #define matter... – Stefano M Nov 15 '12 at 22:22
Well, after some non-"real" operations like addition, I do perform LLT factorization. But it is not a problem to use separate square matrix for factorized matrix. And by the way, Eigen does not do in-place LLT, it performs copy in any case. – qble Nov 15 '12 at 22:25
Ok, I noticed just now that this is just a followup of a previous question . Sorry if I bother you again: forget eigen and implement it yourself, unfolding loops as in this answer but implementing a linear storage scheme – Stefano M Nov 15 '12 at 22:39
I think it actually better to use Eigen to perform addition of such matrices. Even without "real" support, it is still possible to use Eigen. For instance, as I said in original question - just use 1-dimensional matrix. Convert to real 2d matrix only when needed.. – qble Nov 15 '12 at 22:43

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