Saturation numbers in tripartite graphs

Abstract

Given graphs H and F, a subgraph G⊂eq H is an F-saturated subgraph of H if F G, but F⊂eq G+e for all e∈ E(H) E(G). The saturation number of F in H, denoted sat(H,F), is the minimum number of edges in an F-saturated subgraph of H. In this paper we study saturation numbers of tripartite graphs in tripartite graphs. For 1 and n1, n2, and n3 sufficiently large, we determine sat(Kn1,n2,n3,K,,) and sat(Kn1,n2,n3,K,,-1) exactly and sat(Kn1,n2,n3,K,,-2) within an additive constant. We also include general constructions of K,m,p-saturated subgraphs of Kn1,n2,n3 with few edges for m p>0.