A Tur\'an Type Problem Concerning the Powers of the Degrees of a Graph (revised)

Abstract

For a graph G whose degree sequence is d1,..., dn, and for a positive integer p, let ep(G)=Σi=1ndip. For a fixed graph H, let tp(n,H) denote the maximum value of ep(G) taken over all graphs with n vertices that do not contain H as a subgraph. Clearly, t1(n,H) is twice the Tur\'an number of H. In this paper we consider the case p>1. For some graphs H we obtain exact results, for some others we can obtain asymptotically tight upper and lower bounds, and many interesting cases remain open.

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