The saturation number of K3,3

Abstract

A graph G is called F-saturated if G does not contain F as a subgraph (not necessarily induced) but the addition of any missing edge to G creates a copy of F. The saturation number of F, denoted by sat(n,F), is the minimum number of edges in an n-vertex F-saturated graph. Determining the saturation number of complete partite graphs is one of the most important problems in the study of saturation number. The value of sat(n,K2,2) was shown to be 3n-52 by Ollmann, and a shorter proof was later given by Tuza. For K2,3, there has been a series of study aiming to determine sat(n,K2,3) over the years. This was finally achieved by Chen who confirmed a conjecture of Bohman, Fonoberova, and Pikhurko that sat(n, K2,3)= 2n-3 for all n≥ 5. In this paper, we prove a conjecture of Pikhurko and Schmitt that sat(n, K3,3)=3n-9 when n ≥ 9.