# performance of multiplying 2 identical/nonidentical matrix

I am carrying out some performance test on scientific application and trying to take into account all elements that can affect performance of application(like cache size hierarchy cpu speed ... cache line and what ever can be involve with performance). This question comes to my mind although it might be stupid one but i would like to make it obvious to me.

*Question:*

if I am not right correct me please.cost of processing int and float or double value is different on processor and that is because of using CPU floating point unit (to calculate floating point values) . Now I want to know if there is difference between filling two 2d matrix with the same float or double value and multiply them or fill them with random float or double value and then multiplying them. Dose compiler use cacheing for matrix which all elements have the same values?.

Altogether processing processing floating value like (A.B) in which A and B can be numbers with different size in digits if size of A and B have any impact on processing time (for example multiplication) or not? and if there is a difference dose it important to consider it or not? . I am able to measure performance of my application using performance counter library but because of the overhead of used library you can not say for sure that Instruction/flops variation is for random value or other parameter like I/Dcache miss, cache size, problem size or other parameters.

used machine intel E4500. compiler g++ 4.7.

Thanks

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I strongly doubt the compiler will cache the values. Some maths API, on the other hand, might. There's even a (probably slim) chance that the processor may. To benchmark, run it enough times or on a big enough matrix so that it actually takes at least a few seconds, and populate the matrix outside of the performance check. –  Dukeling Jan 1 '13 at 12:49
This is why high-level optimisations are more important than low-level optimisations. If you know that all the values are the same, you can reduce the problem from O(n^3) to O(n^2), whereas no matter how smart the processor is, it will always be O(n^3) if you perform the full multiplication. –  Omri Barel Jan 1 '13 at 14:48
Your question is really general. Can you be more specific as to the circumstances? Mentioning all possible optimizations across the entire stack is almost impossible in such a general case. –  Eamon Nerbonne Jan 3 '13 at 16:22
For starters, what library/ API are you using to do the matrix computations? –  Eamon Nerbonne Jan 3 '13 at 16:23
actually using library/API for performing matrix multiplication is not important in this case. –  mjr Jan 5 '13 at 14:40