Saturation Numbers for Berge Cliques

Abstract

Let F be a graph and H be a hypergraph, both embedded on the same vertex set. We say H is a Berge-F if there exists a bijection φ:E(F) E(H) such that e⊂eq φ(e) for all e∈ E(F). We say H is Berge-F-saturated if H does not contain any Berge-F, but adding any missing edge to H creates a copy of a Berge-F. The saturation number satk(n,Berge-F) is the least number of edges in a Berge-F-saturated k-uniform hypergraph on n vertices. We show \[ satk(n,Berge-K) -2k-1n, \] for all k,≥ 3. Furthermore, we provide some sufficient conditions to imply that satk(n,Berge-F)=O(n) for general graphs F.