Resolution of the Erdos-Sauer problem on regular subgraphs

Abstract

In this paper we completely resolve the well-known problem of Erdos and Sauer from 1975 which asks for the maximum number of edges an n-vertex graph can have without containing a k-regular subgraph, for some fixed integer k≥ 3. We prove that any n-vertex graph with average degree at least Ck n contains a k-regular subgraph. This matches the lower bound of Pyber, R\"odl and Szemer\'edi and substantially improves an old result of Pyber, who showed that average degree at least Ck n is enough. Our method can also be used to settle asymptotically a problem raised by Erdos and Simonovits in 1970 on almost regular subgraphs of sparse graphs and to make progress on the well-known question of Thomassen from 1983 on finding subgraphs with large girth and large average degree.