The maximum spectral radius of graphs of given size with forbidden subgraph

Abstract

Let G be a graph of size m and (G) be the spectral radius of its adjacency matrix. A graph is said to be F-free if it does not contain a subgraph isomorphic to F. In this paper, we prove that if G is a K2,r+1-free non-star graph with m≥ (4r+2)2+1, then (G)≤ (Sm1), with equality if and only if G Sm1. Recently, Li, Sun and Wei showed that for any θ1,2,3-free graph of size m≥ 8, (G)≤ 1+4m-32, with equality if and only if G Sm+32,2. However, this bound is not attainable when m is even. We proved that if G is θ1,2,3-free and G Sm+32,2 with m≥ 22, then (G)≤ (Fm,1) if m is even, with equality if and only if G Fm,1, and (G)≤ (Fm,2) if m is odd, with equality if and only if G Fm,2.

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