Spectral conditions for k-extendability and k-factors of bipartite graphs
Abstract
Let G be a connected graph. If G contains a matching of size k, and every matching of size k is contained in a perfect matching of G, then G is said to be k-extendable. A k-regular spanning subgraph of G is called a k-factor. In this paper, we provide spectral conditions for a (balanced bipartite) graph with minimum degree δ to be k-extendable, and for the existence of a k-factor in a balanced bipartite graph, respectively. Our results generalize some previous results on perfect matchings of graphs, and extend the results in D.F and W.L to k-extendable graphs. Furthermore, our results generalize the result of Lu, Liu and Tian Lu-Liu to general regular factors. Additionally, using the equivalence of k edge-disjoint perfect matchings and k-factors in balanced bipartite graphs, our results can derive a spectral condition for the existence of k edge-disjoint perfect matchings in balanced bipartite graphs.
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