The Minimum Degree Removal Lemma Thresholds

Abstract

The graph removal lemma is a fundamental result in extremal graph theory which says that for every fixed graph H and > 0, if an n-vertex graph G contains n2 edge-disjoint copies of H then G contains δ nv(H) copies of H for some δ = δ(,H) > 0. The current proofs of the removal lemma give only very weak bounds on δ(,H), and it is also known that δ(,H) is not polynomial in unless H is bipartite. Recently, Fox and Wigderson initiated the study of minimum degree conditions guaranteeing that δ(,H) depends polynomially or linearly on . In this paper we answer several questions of Fox and Wigderson on this topic.