Perfect matching and distance spectral radius in graphs and bipartite graphs
Abstract
A perfect matching in a graph G is a set of nonadjacent edges covering every vertex of G. Motivated by recent progress on the relations between the eigenvalues and the matching number of a graph, in this paper, we aim to present a distance spectral radius condition to guarantee the existence of a perfect matching. Let G be an n-vertex connected graph where n is even and λ1(D(G)) be the distance spectral radius of G. Then the following statements are true. I) If 4 n10 and λ 1 (D(G)) λ 1 (D(Sn,n2-1)), then G contains a perfect matching unless G Sn,n2-1 where Sn,n2-1 Kn2-1 (n2+1)K1. II) If n 12 and λ 1 (D(G)) λ 1 (D(G*)), then G contains a perfect matching unless G G* where G* K1 (Kn-32K1). Moreover, if G is a connected 2n-vertex balanced bipartite graph with λ1(D(G)) λ1(D(Bn-1,n-2)) , then G contains a perfect matching, unless G Bn-1,n-2 where Bn-1,n-2 is obtained from Kn,n-2 by attaching two pendent vertices to a vertex in the n-vertex part.
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