The asymptotic behaviour of sat(n,F)

Abstract

For a family F of graphs, sat(n,F) is the minimum number of edges in a graph G on n vertices which does not contain any of the graphs in F but such that adding any new edge to G creates a graph in F. For singleton families F, Tuza conjectured that sat(n,F)/n converges and Truszczynski and Tuza discovered that either sat(n,F)= (1-1/r)n+o(n) for some integer r ≥ 1 or sat(n,F) ≥ n+o(n) . This is often cited in the literature as the main progress towards proving Tuza's Conjecture. Unfortunately, the proof is flawed. We give a correct proof, which requires a novel construction. Moreover, for finite families F, we completely determine the possible asymptotic behaviours of sat(n,F) in the sparse regime sat(n,F) ≤ n+o(n). Finally, we essentially determine which sequences of integers are of the form (sat(n,F))n ≥ 0 for some (possibly infinite) family F.