A proof of a conjecture of Erdos, Faudree, Rousseau and Schelp on subgraphs of minimum degree k

Abstract

Erdos, Faudree, Rousseau and Schelp observed the following fact for every fixed integer k≥ 2: Every graph on n≥ k-1 vertices with at least (k-1)(n-k+2)+k-2 2 edges contains a subgraph with minimum degree at least k. However, there are examples in which the whole graph is the only such subgraph. Erdos et al. conjectured that having just one more edge implies the existence of a subgraph on at most (1-k)n vertices with minimum degree at least k, where k>0 depends only on k. We prove this conjecture, using and extending ideas of Mousset, Noever and Skori\'c.