A spectral Erdos-Rademacher theorem

Abstract

A classical result of Erdos and Rademacher (1955) indicates a supersaturation phenomenon. It says that if G is a graph on n vertices with at least n2/4 +1 edges, then G contains at least n/2 triangles. We prove a spectral version of Erdos--Rademacher's theorem. Moreover, Mubayi [Adv. Math. 225 (2010)] extends the result of Erdos and Rademacher from a triangle to any color-critical graph. It is interesting to study the extension of Mubayi from a spectral perspective. However, it is not apparent to measure the increment on the spectral radius of a graph comparing to the traditional edge version (Mubayi's result). In this paper, we provide a way to measure the increment on the spectral radius of a graph and propose a spectral version on the counting problems for color-critical graphs.