Critical 3-hypergraphs (detailed version)

Abstract

Given a 3-hypergraph H, a subset M of V(H) is a module of H if for each e∈ E(H) such that e M≠ and e M≠, there exists m∈ M such that e M=\m\ and for every n∈ M, we have (e\m\)\n\∈ E(H). For example, , V(H) and \v\, where v∈ V(H), are modules of H, called trivial. A 3-hypergraph is prime if all its modules are trivial. Furthermore, a prime 3-hypergraph is critical if all its induced subhypergraphs, obtained by removing one vertex, are not prime. We characterize the critical 3-hypergraphs.