How to reduce the branch divergence of binary search using CUDA

The application is to intersect two sorted list of integers (set intersection), say list1 and list2.

Each element of list1 will be assigned a GPU thread, and do binary search to check whether it appears in the list2. It is easy to see that there will be huge amount thread divergences in this application. I wonder if there is any good approach to reduce thread divergences. I am using CUDA to implement this application.

I know there is an approach called P-ary search, but my task is to reduce the thread divergence of binary search. Also I know there is library called thrust, but it seems there is no attempt on reducing the divergences.

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How big are the sets of integers? On divergences, merging two lists of length `n` involves `O(n)` comparisons, each of which will create a divergence. I think that you have to accept that you will have a lot of divergences, and then keep them short. (A bigger challenge is making sure that you load blocks of memory in parallel.) –  btilly Apr 30 '12 at 22:00
i agree - memory access is a bigger problem that divergence. you've got two source of divergence as far as i can see - the binary search step and termination. you don't care much about termination, since those threads are done anyway, and the binary step in a loop is only an if/else updating an index. much much worse than that is the fact that you're going to be reading from all over the place in the second list. i guess sorting both lists first might help a little. –  andrew cooke May 1 '12 at 0:39
duh. sorting list1. –  andrew cooke May 1 '12 at 1:31

If both lists are sorted, binary search is not the best algorithm you can do. Binary search will give `O(n lg n)`, but just doing a merge-like algorithm, only taking intersections, is `O(n)`.

This is a silly algorithm to use a GPU for. The only case I see is that you've just generated the data in the GPU. In which case, you want to break the problem up into a bunch of smaller intersections and assign a thread to each.

To do that, pick `k` equally-spaced elements of list1 and find them in list2 using binary search. Similarly, pick `k` equally-spaced elements of list2 and find them in list1. You now have `2k` ranges in each list, where each range has at most `N/k` elements. Now intersect those ranges in parallel. (Set `k` to be half the number of threads you want.)

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Why you search from the second list in the first list? –  Fan Zhang May 15 '12 at 9:18
You want to make sure that each sublist has at most N/k elements. If you picked splitting points from just one list, the subrange from the other list may be too large. –  Keith Randall May 15 '12 at 15:41

Posible code:

``````    bool end = false;
bool found = false;

while(!end && !found)
{
int diff        = max-min;
int middle      = min + (diff / 2);

end             = diff < 1;
found           = element[middle] == element;
if (index < elements[middle])
max = middle-1;
else //(index > elements[middle+1])
min = middle + 2;
}
return found;
``````

Warning: this code could generate exception by access out of range memory

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