Degree powers in C5-free graphs

Abstract

Let G be a graph with degree sequence d1,d2,…,dn. Given a positive integer p, denote by ep(G)=Σi=1n dip. Caro and Yuster introduced a Tur\'an-type problem for ep(G): given an integer p, how large can ep(G) be if G has no subgraph of a particular type. They got some results for the subgraph of particular type to be a clique of order r+1 and a cycle of even length, respectively. Denote by exp(n,H) the maximum value of ep(G) taken over all graphs with n vertices that do not contain H as a subgraph. Clearly, ex1(n,H)=2ex(n,H), where ex(n,H) denotes the classical Tur\'an number. In this paper, we consider exp(n, C5) and prove that for any positive integer p and sufficiently large n, there exists a constant c=c(p) such that the following holds: if exp(n, C5)=ep(G) for some C5-free graph G of order n, then G is a complete bipartite graph having one vertex class of size cn+o(n) and the other (1-c)n+o(n).