Hi all, i came across a real life problem where we have N workers and M jobs and edges are given for valid matching with it's weight. Maximum weight matching here can be found using Hungarian's algorithm where complexity will be O(max(N,M)^3). Here N <= 100 and M <= 2000. Can we have some optimisation here for this case such that we don't need to create dummy entries to make MxM matrix? Or is there any other solution?
realization from e-maxx works in O($$$n^2 * m $$$)