Bipartite graphs with the double Hall property

Abstract

The super-neighborhood of a vertex set A in a graph G, denoted by Λ2(A), is the set of vertices adjacent to at least two vertices in A. We say that a bipartite graph G=(X, Y) with |X| ≥ 2 satisfies the double Hall property (with respect to X) if |Λ2(A)| ≥ |A| for any subset A ⊂eq X with |A| ≥ 2. Kostochka et al. first conjectured that if a bipartite graph G=(X, Y) satisfies a slightly weaker version of the double Hall property, then G contains a cycle that covers all vertices of X. They verified their conjecture for |X| ≤ 6. In this paper, we extend their result to |X| = 7. Later, Salia conjectured that every bipartite graph satisfying the double Hall property has a cycle covering all vertices of X. We show that Salia's conjecture is almost equivalent to a much weaker conjecture requiring vertices in Y to have high degrees. By extending a result of Barát et al., we also show that Salia's conjecture holds for some graphs where the vertices of Y have degree either 2 or very high. Finally, we establish a lower bound for the maximum degree of graphs satisfying the double Hall property and present deterministic and probabilistic constructions of such graphs that approach this bound.