Subdivision-free graphs with the maximum spectral radius

Abstract

Given a graph family H, let SPEX(n,H sub) denote the set of n-vertex H-subdivision-free graphs with the maximum spectral radius. In this paper, we investigate the problem of graph subdivision from a spectral extremal perspective, with a focus on the structural characterization of graphs in SPEX(n,H sub). For any graph H ∈ H, let α(H) denote its independence number. Define γH:=H∈ H\|H| - α(H) - 1\. We prove that every graph in SPEX(n,H sub) contains a spanning subgraph isomorphic to KγH (n-γH)K1, which is obtained by joining a γH-clique with an independent set of n-γH vertices. This extends a recent result by Zhai, Fang, and Lin concerning spectral extremal problems for H-minor-free graphs.