# CUDA reduction using registers

I need to calculate N signals' mean values using reduction. The input is a 1D array of size MN, where M is the length of each signal.

Originally I had additional shared memory to first copy the data and do the reduction on each signal. However, the original data is corrupted.

My program tries to minimize the shared memory. So I was wondering how I can use registers to do a reduction sum on N signals. I have N threads, a shared memory (float) s_m[N*M], 0....M-1 is the first signal, etc.

Do I need N registers (or one) to store do mean value of N different signals? (I know how to do with sequential addition using multi-thread programming and 1 register). The next step I want to do is subtract every value in the input from its correspondent signal's mean.

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Uh, I should explain this more clearly. I have N threads, a shared memory (float) s_m[N*M], 0....M-1 is the first signal, etc. Do I need N registers (or one) to store do mean value of N different signals? The next step I want to do is subtract every value in the input from its correspondent signal's mean. That's why I don't want additional shared memory. Hope that explains a little bit more. Thanks – andyzhangcr7 Jul 22 '11 at 2:49
Might want to edit that into your question instead of as a comment. – Jesus Ramos Jul 22 '11 at 2:51
What are some example sizes of M and N? – harrism Jul 22 '11 at 5:12
I love: the original corrupt is corrupted – fabrizioM Jul 22 '11 at 19:44
I would expect N = 32 and M < 128 – andyzhangcr7 Jul 23 '11 at 2:12

Your problem is very small (N = 32 and M < 128). However, some guidelines:

Assuming you are reducing across N values for each of N threads.

• If N is very large (> 10s of thousands) large, just do the reductions over M sequentially in each thread.
• If N is < 10s of thousands, consider using one warp or one thread block to perform each of the N reductions.
• If N is very small but M is very large, consider using multiple thread blocks per each of the N reductions.
• If N is very small and M is very small (as your numbers are), only consider using the GPU for the reductions if the computations that generate and / or consume the input / output of the reductions are also running on the GPU.
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Based on my understanding of the question, I say that you don't need N registers to store the mean value of N different signals.

If you already have N threads [Given that each thread do reduction on only one signal], then you don't need N registers to store the reduction of one signal. All you need is one register to store the mean value.

reduction<<<threads,1>>>(signals);  // signals is the [N*M] array

__global__ reduction (int *signals)
{
float meanValue = 0.0;

for(int i = 0; i < M; i++)
meanValue = signals[id*M +i];

meanValue =  meanValue/M;

// Then do the subtraction
for(int i = 0; i < M; i++)
signals[id*M +i] -= meanValue;
}

If you need to do Kind of global reduction of all the meanValues of N different signals, then you need to use 2 registers [one to store the local mean and another to store the global mean] and the shared memory

reduction<<<threads,1>>>(signals);  // signals is the [N*M] array

__global__ reduction (int *signals)
{
__shared__ float means[N];      // shared value
float meanValue = 0.0;
float globalMean = 0.0;

for(int i = 0; i < M; i++)
meanValue += signals[id*M +i];

means[id] =  meanValue/M;

// do the global reduction
for(int i = 0; i < N; i++)
globalMean += means[i];

globalMean = globalMean/N;

// Then do the subtraction
for(int i = 0; i < M; i++)
signals[id*M +i] -= globalMean;
}

I hope this helps you. Any doubts, let me know.

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I very much doubt either of those kernels would work correctly. – talonmies Jul 24 '11 at 8:28
Why do you think so.. Am I doing something wrong? – veda Jul 24 '11 at 16:40
The globsl memory indexing scheme in both kernels is wrong (irrespective of storage order, it is inconsistent with either row or cooumn major storage), and the second kernel lacks synchronization in two places that can lead to both shared and global memory races. – talonmies Jul 24 '11 at 17:30
Sorry for wrong indexing. Thanks for pointing out the error. – veda Jul 24 '11 at 17:38
Hi, Veda, sorry for replying you late. I should have clarified the reduction here. I mean the reduction in optimization. Suppose you want to calculate the first signal's sum, instead of adding s_x[0] to s_x[M-1], you do either interleaving addressing like s_x[0] += s_x[N/2-1] etc. I was wondering it this kind of optimization can be done on the register mean. For other parts, my program did the same thing as yours, except I think id*M would cause bank conflicts so I modified the way to read them. – andyzhangcr7 Jul 25 '11 at 5:02