The edge ideals of complete multipartite hypergraphs

Abstract

We classify all complete uniform multipartite hypergraphs with respect to some algebraic properties, such as being (almost) complete intersection, Gorenstein, level, l-Cohen-Macaulay, l-Buchsbaum, unmixed, and satisfying Serre's condition Sr, via some combinatorial terms. Also, we prove that for a complete s-uniform t-partite hypergraph H, vertex decomposability, shellability, sequentially Sr and sequentially Cohen-Macaulay properties coincide with the condition that H has t-1 sides consisting of a single vertex. Moreover, we show that the latter condition occurs if and only if it is a chordal hypergraph.