Ramsey and Tur\'an numbers of sparse hypergraphs

Abstract

Degeneracy plays an important role in understanding Tur\'an- and Ramsey-type properties of graphs. Unfortunately, the usual hypergraphical generalization of degeneracy fails to capture these properties. We define the skeletal degeneracy of a k-uniform hypergraph as the degeneracy of its 1-skeleton (i.e., the graph formed by replacing every k-edge by a k-clique). We prove that skeletal degeneracy controls hypergraph Tur\'an and Ramsey numbers in a similar manner to (graphical) degeneracy. Specifically, we show that k-uniform hypergraphs with bounded skeletal degeneracy have linear Ramsey number. This is the hypergraph analogue of the Burr-Erdos conjecture (proved by Lee). In addition, we give upper and lower bounds of the same shape for the Tur\'an number of a k-uniform k-partite hypergraph in terms of its skeletal degeneracy. The proofs of both results use the technique of dependent random choice. In addition, the proof of our Ramsey result uses the `random greedy process' introduced by Lee in his resolution of the Burr-Erdos conjecture.

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