On degree power sum in Pk-free graphs

Abstract

Let G be a graph on n vertices with degree sequence (d1,d2......dn). For a real p ≥ 1, let Dp(G)=Σi=1ndip. A Tur\'an-type problem of degree power sum was initiated by Caro and Yuster caro2000degpower: determining the function Dp(n,H) := \Dp(G): G is an n-vertex H-free graph\. They obtained some exact values for certain graphs H. For a path Pk, they mentioned that ``a close examination of the proof of Theorem 1.2 shows that the value of n0(k) in the statement of the theorem is O(k2)", namely, they could show the n-vertex Pk-free graph with maximum degree power sum is Wn,k-1, k2 -1 = K k2 -1 ((n - k2 )K1 K1+k-2 k2 ) when n ≥ c k2 for some constant c. In this note, we improve their result to a linear size of k by a different approach. The bound is tight up to a constant factor.

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