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# CUDA efficient division?

I would like to know if there is, by any chance an efficient way of dividing elements of an array. I am running with matrix values 10000x10000 and it a considerable amount of time in comparison with other kernels. Division are expensive operations, and I can't see how to improve it.

``````__global__ void division(int N, float* A, int* B){

int row = blockIdx.x * blockDim.x + threadIdx.x;
int col = blockIdx.y * blockDim.y + threadIdx.y;

if((row < N) && (col <= row) ){
if( B[row*N+col] >0 )
A[row*N+col] /= (float)B[row*N+col];
}

}
``````

kernel launched with

``````  int N = 10000;
dim3 b(blocks, blocks);
division<<< b, t >>>(N, A, B);
``````

Option B:

``````__global__ void division(int N, float* A, int* B){
int k =  blockIdx.x * blockDim.x + threadIdx.x;
int kmax = N*(N+1)/2
int i,j;
if(k< kmax){
row = (int)(sqrt(0.25+2.0*k)-0.5);
col = k - (row*(row+1))>>1;
if( B[row*N+col] >0 )
A[row*N+col] /= (float)B[row*N+col];
}
}
``````

launched with

``````  int threads =192;
``````

Why is option B giving a wrong result even if the threadIds are the correct one? what is missing here?

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So in this kernel, for the 1000x1000 case N=1000? – talonmies Oct 4 '12 at 15:02
@talonmies: yes, sorry. Updated – Manolete Oct 4 '12 at 15:03
You now have N=10000. Should that be N=1000? – talonmies Oct 4 '12 at 15:04
No, it is actually 10000 – Manolete Oct 4 '12 at 15:08
So you are launching 100 million threads and then deliberately having half of them do nothing more than a few IOPs and you are wondering why the kernel runs slowly? I think you are looking in the wrong place for a performance improvement. Slow division isn't your problem...... – talonmies Oct 4 '12 at 15:13

Your basic problem is that you are launching an improbably huge grid (over 100 million threads for your 10000x10000 array example), and then because of the triangular nature of the access pattern in the kernel, fully half of those threads never do anything productive. So a enormous amount of GPU cycles are being wasted for no particularly good reason. Further, the access pattern you are using isn't allowing coalesced memory access, which is going to further reduce the performance of the threads which are actually doing useful work.

If I understand your problem correctly, the kernel is only performing element-wise division on a lower-triangle of a square array. If this is the case, it could be equally done using something like this:

``````__global__
void division(int N, float* A, int* B)
{
for(int row=blockIdx.x; row<N; row+=gridDim.x) {
int val = max(1,B[row*N+col]);
A[row*N+col] /= (float)val;
}
}
}
``````

[disclaimer: written in browser, never compiled, never tested, use at own risk]

Here, a one dimension grid is used, with each block computing a row at a time. Threads in a block move along the row, so memory access is coalesced. In comments you mention your GPU is a Tesla C2050. That device only requires 112 blocks of 192 threads each to completely "fill" each of the 14 SM with a full complement of 8 blocks each and the maximum number of concurrent threads per SM. So the launch parameters could be something like:

``````int N = 10000;
int blocks = min(8*14, N);
``````

I would expect this to run considerably faster than your current approach. If numerical accuracy isn't that important, you can probably achieve further speed-up by replacing the division with an approximate reciprocal intrinsic and a floating point multiply.

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@ talonmies: it looks a much better approach, however it does not speed up the code. Thanks for that, it really helped me to understand CUDA a bit more. – Manolete Oct 5 '12 at 8:55
@Manolete: I have benchmarked it since I posted the answer and it most certainly does speed up the code. On a GTX670 I got about 7 times speed up over your original kernel. Are you sure you are timing this correctly? – talonmies Oct 5 '12 at 9:15
@ talonmies: Let me double check, but the whole application takes same amount of time – Manolete Oct 5 '12 at 9:22
@ talonmies: `N=8999` -> mykernel: `1.30893 sec`, yourKernel:`1.28179 sec` – Manolete Oct 5 '12 at 9:30
What is the situation if you launch a kernel with an awful number of blocks (i.e >> 65535)? Could be the reason of a wrong result? – Manolete Oct 5 '12 at 9:52

Because threads are executed in groups of 32, called warps, you are paying for the division for all 32 threads in a warp if both `if` conditions are `true` for just one of the threads. If the condition is `false` for many threads, see if you can filter out the values for which the division is not needed in a separate kernel.

The int to float conversion may itself be slow. If so, you might be able to generate floats directly in your earlier step, and pass B in as an array of floats.

You may be able to generate inverted numbers in the earlier step, where you generate the B array. If so, you can use multiplication instead of division in this kernel. `(a / b == a * 1 / b)`.

Depending on your algorithm, maybe you can get away with a lower precision division. There's an intrinsic, `__fdividef(x, y)`, that you can try. There is also a compiler flag, `-prec-div=false`.

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Low threads per block? The block size is 1024 (32x32) which is the maximum on much recent hardware..... – talonmies Oct 4 '12 at 14:59
@talonmies: Oops. Answer fixed. – Roger Dahl Oct 4 '12 at 15:08
Yes, that is the maximum number I can use in a Fermi 2050 – Manolete Oct 4 '12 at 15:10
Suspecting that the kernel is not using too much registers, , I would also tried with blocks of 192x1 threads to feed each SM with the maximum threads available. – pQB Oct 4 '12 at 15:16

The very first thing to look at should be coalesced memory access. There is no reason for the non-coalesced pattern here, just exchange rows and columns for to avoid wasting a lot of memory bandwidth:

``````int col = blockIdx.x * blockDim.x + threadIdx.x;
int row = blockIdx.y * blockDim.y + threadIdx.y;
...
A[row*N+col] ...
``````

Even if this is run on compute capability 2.0 or higher, the caches are not large enough to remedy this suboptimal pattern.

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