Spectral conditions for forbidden subgraphs in bipartite graphs

Abstract

A graph G is H-free, if it contains no H as a subgraph. A graph is said to be H-minor free, if it does not contain H as a minor. In recent years, Nikiforov asked that what is the maximum spectral radius of an H-free graph of order n? In this paper, we consider about some Brualdi-Solheid-Tur\'an type problems on bipartite graphs. In 2015, Zhai, Lin and Gong proved that if G is a bipartite graph with order n ≥ 2k+2 and (G)≥ (Kk,n-k), then G contains a C2k+2 unless G Kk,n-k [Linear Algebra Appl. 471 (2015)]. Firstly, we give a new and more simple proof for the above theorem. Secondly, we prove that if G is a bipartite graph with order n ≥ 2k+2 and (G)≥ (Kk,n-k), then G contains all T2k+3 unless G Kk,n-k. Finally, we prove that among all outerplanar bipartite graphs on n>344569 vertices, K1,n-1 attains the maximum spectral radius.