Entropy Bounds for Perfect Matchings in Bipartite Hypergraphs

Abstract

A hypergraph is bipartite with bipartition (A, B) if every edge has exactly one vertex in A, and a matching in such a hypergraph is A-perfect if it saturates every vertex in A. We prove an upper bound on the number of A-perfect matchings in uniform hypergraphs with small maximum codegree. Using this result, we prove that there exist order-n Latin squares with at most (n/e2.117)n transversals when n is odd and n 0 3. We also show that k-uniform D-regular hypergraphs on n vertices have at most ((1+o(1))q/ek)Dn/k proper q-edge-colorings when q = (1+o(1))D and the maximum codegree is o(q).