Many cliques with small degree powers

Abstract

Suppose 0 < p ∞. For a simple graph G with a vertex-degree sequence d1, …, dn satisfying (d1p + … + dnp)1/p C, we prove asymptotically sharp upper bounds on the number of t-cliques in G. This result bridges the p = 1 case, which is the notable Kruskal--Katona theorem, and the p = ∞ case, known as the Gan--Loh--Sudakov conjecture, and resolved by Chase. In particular, we demonstrate that the extremal construction exhibits a dichotomy between a single clique and multiple cliques at p0 = t - 1. Our proof employs the entropy method.

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