On the sizes of vertex-k-maximal r-uniform hypergraphs

Abstract

Let H=(V,E) be a hypergraph, where V is a set of vertices and E is a set of non-empty subsets of V called edges. If all edges of H have the same cardinality r, then H is a r-uniform hypergraph; if E consists of all r-subsets of V, then H is a complete r-uniform hypergraph, denoted by Knr, where n=|V|. A hypergraph H'=(V',E') is called a subhypergraph of H=(V,E) if V'⊂eq V and E'⊂eq E. A r-uniform hypergraph H=(V,E) is vertex-k-maximal if every subhypergraph of H has vertex-connectivity at most k, but for any edge e∈ E(Knr) E(H), H+e contains at least one subhypergraph with vertex-connectivity at least k+1. In this paper, we first prove that for given integers n,k,r with k,r≥2 and n≥ k+1, every vertex-k-maximal r-uniform hypergraph H of order n satisfies |E(H)|≥ (nr)-(n-kr), and this lower bound is best possible. Next, we conjecture that for sufficiently large n, every vertex-k-maximal r-uniform hypergraph H on n vertices satisfies |E(H)|≤(nr)-(n-kr)+(nk-2)(kr), where k,r≥2 are integers. And the conjecture is verified for the case r>k.