Perfect matchings and Aα-spectral radius in 1-binding graphs

Abstract

Let G be a graph with vertex set V(G) and edge set E(G). For α∈[0,1), we use Aα(G) and α(G) to denote the Aα-matrix and the Aα-spectral radius of G, respectively. The binding number bind(G) of G is defined by bind(G)=\|NG(X)||X|:≠ X⊂eq V(G),NG(X)≠ V(G)\. If bind(G)≥1, then G is called 1-binding. A perfect matching in G is a set of nonadjacent edges covering every vertex of G. Tutte proved that a graph G of even order has a perfect matching if and only if o(G-S)≤|S| holds for every S⊂eq V(G) [W. Tutte, The factorization of linear graphs, J. Lond. Math. Soc. 22 (1947) 107--111]. In this paper, we use Tutte's result to prove that a connected 1-binding graph G of even order n with n≥ n(α) has a perfect matching unless G=K1(Kn-5 K3 K1) if α(G)≥α(K1(Kn-5 K3 K1)), where n(α) is defined as follows: n(α)=\18,2+8α1-2α\ if α∈[0,12), and n(α)=18 if α=12.