In order to compute the product between 2 matrices A and B (nxm dimension) in a parallel mode, I have the following restrictions: the server sends to each client a number of rows from matrix A, and a number of rows from matrix B. This cannot be changed. Further the clients may exchange between each other information so that the matrices product to be computed, but they cannot ask the server to send any other data.

This should be done the most efficient possible, meaning by minimizing the number of messages sent between processes - considered as an expensive operation - and by doing the small calculations in parallel, as much as possible.

From what I have researched, practically the highest number of messages exchanged between the clients is n^2, in case each process broadcasts its lines to all the others. Now, the problem is that if I minimize the number of messages sent - this would be around log(n) for distributing the input data - but the computation then would only be done by one process, or more, but anyhow, it is not anymore done in parallel, which was the main idea of the problem.

What could be a more efficient algorithm, that would compute this product?

(I am using MPI, if it makes any difference).

`n`

nodes it will require`n*n`

traffic, and in the same time each node will produce less useful information per its traffic. – ruslik Dec 8 '10 at 22:47