The double Hall property and cycle covers in bipartite graphs
Abstract
In a graph G, the 2-neighborhood of a vertex set X consists of all vertices of G having at least 2 neighbors in X. We say that a bipartite graph G(A,B) satisfies the double Hall property if |A|≥2, and every subset X ⊂eq A of size at least 2 has a 2-neighborhood of size at least |X|. Salia conjectured that any bipartite graph G(A,B) satisfying the double Hall property contains a cycle covering A. Here, we prove the existence of a 2-factor covering A in any bipartite graph G(A,B) satisfying the double Hall property. We also show Salia's conjecture for graphs with restricted degrees of vertices in B. Additionally, we prove a lower bound on the number of edges in a graph satisfying the double Hall property, and the bound is sharp up to a constant factor.
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