Kr-saturated Graphs and the Two Families Theorem

Abstract

Given a graph H, we say that a graph G is H-saturated if G contains no copy of H but adding any new edge to G creates a copy of H. Let sat(n,Kr,t) be the minimum number of edges in a Kr-saturated graph on n vertices with minimum degree at least t. Day showed that for fixed r ≥ 3 and t ≥ r-2, sat(n,Kr,t)=tn-c(r,t) for large enough n, where c(r,t) is a constant depending on r and t, and proved the bounds 2t t3/2 r c(r,t) ≤ tt2t2 for fixed r and large t. In this paper we show that for fixed r and large t, the order of magnitude of c(r,t) is given by c(r,t)=r (4t t-1/2 ). Moreover, we investigate the dependence on r, obtaining the estimates 4t-rt-r+3 + r2 c(r,t) 4t-r (r,t-r+3)t-r+3 + r2 \ . We further show that for all r and t, there is a finite collection of graphs such that all extremal graphs are blow-ups of graphs in the collection. Using similar ideas, we show that every large Kr-saturated graph with e edges has a vertex cover of size O(e / e), uniformly in r ≥ 3. This strengthens a previous result of Pikhurko. We also provide examples for which this bound is tight. A key ingredient in the proofs is a new version of Bollob\'as's Two Families Theorem.