Uniquely K(k)r-saturated Hypergraphs

Abstract

In this paper we generalize the concept of uniquely Kr-saturated graphs to hypergraphs. Let Kr(k) denote the complete k-uniform hypergraph on r vertices. For integers k,r,n such that 2 k <r<n, a k-uniform hypergraph H with n vertices is uniquely Kr(k)-saturated if H does not contain Kr(k) but adding to H any k-set that is not a hyperedge of H results in exactly one copy of Kr(k). Among uniquely Kr(k)-saturated hypergraphs, the interesting ones are the primitive ones that do not have a dominating vertex---a vertex belonging to all possible n-1 k-1 edges. Translating the concept to the complements of these hypergraphs, we obtain a natural restriction of τ-critical hypergraphs: a hypergraph H is uniquely τ-critical if for every edge e, τ(H-e)=τ(H)-1 and H-e has a unique transversal of size τ(H)-1. We have two constructions for primitive uniquely Kr(k)-saturated hypergraphs. One shows that for k and r where 4 k<r 2k-3, there exists such a hypergraph for every n>r. This is in contrast to the case k=2 and r=3 where only the Moore graphs of diameter two have this property. Our other construction keeps n-r fixed; in this case we show that for any fixed k 2 there can only be finitely many examples. We give a range for n where these hypergraphs exist. For n-r=1 the range is completely determined: k+1 n (k+2)2 4. For larger values of n-r the upper end of our range reaches approximately half of its upper bound. The lower end depends on the chromatic number of certain Johnson graphs.