A strengthening of the spectral chromatic critical edge theorem: books and theta graphs

Abstract

The chromatic critical edge theorem of Simonovits states that for a given color critical graph H with (H)=k+1, there exists an n0(H) such that the Tur\'an graph Tn,k is the only extremal graph with respect to ex(n,H) provided n ≥ n0(H). Nikiforov's pioneer work on spectral graph theory implies that the color critical edge theorem also holds if ex(n,H) is replaced by the maximum spectral radius and n0(H) is an exponential function of |H|. We want to know which color critical graphs H satisfy that n0(H) is a linear function of |H|. Previous graphs include complete graphs and odd cycles. In this paper, we find two new classes of graphs: books and theta graphs. Namely, we prove that every graph on n vertices with (G)>(Tn,2) contains a book of size greater than n6.5. This can be seen as a spectral version of a 1962 conjecture by Erdos, which states that every graph on n vertices with e(G)>e(Tn,2) contains a book of size greater than n6. In addition, our result on theta graphs implies that if G is a graph of order n with (G)>(Tn,2), then G contains a cycle of length t for every t≤ n7. This is related to an open question by Nikiforov which asks to determine the maximum c such that every graph G of large enough order n with (G)>(Tn,2) contains a cycle of length t for every t≤ cn.