Degree powers in graphs with a forbidden forest

Abstract

Given a positive integer p and a graph G with degree sequence d1,…,dn, we define ep(G)=Σi=1n dip. Caro and Yuster introduced a Tur\'an-type problem for ep(G): Given a positive integer p and a graph H, determine the function exp(n,H), which is the maximum value of ep(G) taken over all graphs G on 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. Caro and Yuster determined the function exp(n, P) for sufficiently large n, where p≥ 2 and P denotes the path on vertices. In this paper, we generalise this result and determine exp(n,F) for sufficiently large n, where p≥ 2 and F is a linear forest. We also determine exp(n,S), where S is a star forest; and exp(n,B), where B is a broom graph with diameter at most six.