Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

This should be very simple but I could not find an exhaustive answer:

I need to perform A+B = C with matrices, where A and B are two matrices of unknown size (they could be 2x2 or 20.000x20.000 as greatest value)

Should I use CUBLAS with Sgemm function to calculate?

I need the maximum speed achievable so I thought of CUBLAS library which should be well-optimized

share|improve this question
you can use saxpy –  Anycorn Mar 24 '11 at 16:22

3 Answers 3

up vote 3 down vote accepted

For any sort of technical computing, you should always use optimized libraries when available. Existing libraries, used by hundreds of other people, are going to be better tested and better optimized than anything you do yourself, and the time you don't spend writing (and debugging, and optimizing) that function yourself can be better spent working on the actual high-level problem you want to solve instead of re-discovering things other people have already implemented. This is just basic specialization of labour stuff; focus on the compute problem you want to solve, and let people who spend their days professionally writing GPGPU matrix routines do that for you.

Only when you are sure that existing libraries don't do what you need -- maybe they solve too general a problem, or make certain assumptions that don't hold in your case -- should you roll your own.

I agree with the others that in this particular case, the operation is pretty straightforward and it's feasible to DIY; but if you're going to be doing anything else with those matricies once you're done adding them, you'd be best off using optimized BLAS routines for whatever platform you're on.

share|improve this answer
Okay, I'll use CUBLAS. To answer Eric too: I need them also for matrix multiplications (but that wasn't the topic of the question) –  Paul Mar 24 '11 at 16:32
-1: Feasible to DIY? This is the "Hello world!" application for CUDA. –  Eric Mar 25 '11 at 7:45
He's also using CUBLAS for matrix multiplication. And he's doing this for real work, not to learn CUDA; he's trying to get real stuff done. Hello world or not, there is still a significant speed difference depending on block size, etc. So yes, he should use optimized libraries. –  Jonathan Dursi Mar 25 '11 at 11:40
Quick - is the fastest way to do this have one output per thread, or two, or more? Is that true for both single and double precision? How does that answer, and performance overall, vary with blocksize? Gridsize? How do those choices vary with input size? Which of all of those combinations should the OP use for optimal performance? For production code, the OP could go through all those combinations, spending days learning lots about CUDA and the architecture, occasionally debugging -- or he could, you know, use the library he's got which already works fast, and get his real work done. –  Jonathan Dursi Mar 25 '11 at 18:38
And what do you think the odds are that a beginning CUDA programmer is going to beat the CUBLAS saxpy implemnetation? Or the matrix multiplication stuff he's doing? –  Jonathan Dursi Mar 28 '11 at 17:27

And since CUBLAS5.0, cublasgeam can be used for that. It computes the weighted sum of 2 optionally transposed matrices.

share|improve this answer

What you want to do would be trivial to implement in CUDA and will be bandwidth limited.

share|improve this answer
It's not so trivial for me though. What I mean is: I can write code to compute the matrices sum, but how to choose the grid dimension? I know that blocks should have a number of threads multiple of the semiwarp, but this isn't enough.. I would end having a large number of idle threads. I'm not sure on how to proceed –  Paul Mar 24 '11 at 16:16
Unless you have a complicated memory structure for your matrices, this basically boils down to vector addition. There is an example of summing two vectors in the programming guide. The only extension you would need to consider is the case where your last warp partially goes beyond the end of the vector, which is also not difficult to handle. –  Eric Mar 24 '11 at 16:20
So you are suggesting keeping the code simplest as possible.. even then CUBLAS shall not be faster than mine or that's simply wrong? –  Paul Mar 24 '11 at 16:23
CUBLAS will probably be OK for what you want to do, especially if you want to eventually include other matrix operations. However, if all you want to do is matrix addition, it's over kill; vector addition is nearly the most trivial CUDA function you can write. –  Eric Mar 24 '11 at 16:30
I agree with Eric. If all you want to do is this vector addition you have shown above, it is ridiculously easy to write by yourself. See my post for how to slice your data and compute using CUDA: choorucode.wordpress.com/2011/02/16/… –  Ashwin Mar 25 '11 at 6:02

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.