Bipartite graphs with the double Hall property

TL;DR

This paper investigates bipartite graphs with the double Hall property, extending conjectures about cycle coverage, establishing degree bounds, and providing constructions that approach these bounds.

Contribution

It extends the double Hall property conjecture to larger sets, relates it to degree conditions, and offers new constructions and bounds for such graphs.

Findings

Extended the cycle covering conjecture to |X|=7.

Showed Salia's conjecture is nearly equivalent to a degree-based variant.

Provided bounds and constructions for maximum degrees in graphs with the double Hall property.

Abstract

The super-neighborhood of a vertex set $A$ in a graph $G$, denoted by $\Lambda^2(A)$, is the set of vertices adjacent to at least two vertices in $A$. We say that a bipartite graph $G=(X, Y)$ with $|X| \geq 2$ satisfies the double Hall property (with respect to $X$) if $|\Lambda^2(A)| \geq |A|$ for any subset $A \subseteq X$ with $|A| \geq 2$. 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 $|X| \leq 6$. 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 Bar\'at 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.