The Minimum Size of Saturated Hypergraphs

OLEG PIKHURKO

doi:10.1017/S0963548399003971

Abstract

Let [Fscr ] be a family of forbidden k-hypergraphs (k-uniform set systems). An [Fscr ]-saturated hypergraph is a maximal k-uniform set system not containing any member of [Fscr ]. As the main result we prove that, for any finite family [Fscr ], the minimum number of edges of an [Fscr ]-saturated hypergraph is O(nk−1). In particular, this implies a conjecture of Tuza. Some other related results are presented.

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The Minimum Size of Saturated Hypergraphs

Abstract

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