Generalizations and strengthenings of Ryser's conjecture

Abstract

Ryser's conjecture says that for every r-partite hypergraph H with matching number (H), the vertex cover number is at most (r-1)(H). This far reaching generalization of K\"onig's theorem is only known to be true for r≤ 3, or (G)=1 and r≤ 5. An equivalent formulation of Ryser's conjecture is that in every r-edge coloring of a graph G with independence number α(G), there exists at most (r-1)α(G) monochromatic connected subgraphs which cover the vertex set of G. We make the case that this latter formulation of Ryser's conjecture naturally leads to a variety of stronger conjectures and generalizations to hypergraphs and multipartite graphs. Regarding these generalizations and strengthenings, we survey the known results, improving upon some, and we introduce a collection of new problems and results.