Adjacency spectral radius and H-factors in 1-binding graphs

Abstract

Let G be a graph, and let H:V(G)\\1\,\0,2\\ be a set-valued function. Hence, H(v) equals \1\ or \0,2\ for any v∈ V(G). We let H-1(1)=\v: v∈ V(G) \ and \ H(v)=1\. An H-factor of G is a spanning subgraph F of G such that dF(v)∈ H(v) for each v∈ V(G). Lu and Kano showed a characterization for the existence of an H-factor in a graph [Characterization of 1-tough graphs using factors, Discrete Math. 343 (2020) 111901]. Let A(G) and (G) denote the adjacency matrix and the adjacency spectral radius of G, respectively. By using Lu and Kano's result, we pose a sufficient condition with respect to the adjacency spectral radius to guarantee the existence of an H-factor in a 1-binding graph. In this paper, we prove that if a connected 1-binding graph G of order n≥11 satisfies (G)≥(K1(Kn-4 K2 K1)), then G has an H-factor for each H:V(G)\\1\,\0,2\\ with H-1(1) even, unless G=K1(Kn-4 K2 K1).