Coloring Random Non-Uniform Bipartite Hypergraphs

Abstract

Let Hn,(pm)m=2,…,M be a random non-uniform hypergraph of dimension M on 2n vertices, where the vertices are split into two disjoint sets of size n, and colored by two distinct colors. Each non-monochromatic edge of size m=2,…,M is independently added with probability pm. We show that if p2,…,pM are such that the expected number of edges in the hypergraph is at least dn n, for some d>0 sufficiently large, then with probability (1-o(1)), one can find a proper 2-coloring of Hn,(pm)m=2,…,M in polynomial time. We present a polynomial time algorithm for hypergraph 2-coloring, and provide discussions on extension of the approach for k-coloring of non-uniform hypergraphs.