Here is an interesting problem that I encountered in a programming competition:
Problem statement: Given the dimensions of
n matrices, determine if there exists an ordering such that the matrices can be multiplied. If there exists one, print out the size (product of the dimensions) of the resultant matrix.
My observations: This reduces to the NP-complete hamiltonian path problem if you consider each matrix as a vertex and draw a directed edge between matrices that can be multiplied. I solved this by simply brute-forcing the problem but this is clearly very slow. I was wondering if there are any clever optimizations for this particular instance of the problem.