Score lists in multipartite hypertournaments

Abstract

Given non-negative integers ni and αi with 0 ≤ αi ≤ ni (i=1,2,...,k), an [α1,α2,...,αk]-k-partite hypertournament on Σ1kni vertices is a (k+1)-tuple (U1,U2,...,Uk,E), where Ui are k vertex sets with |Ui|=ni, and E is a set of Σ1kαi-tuples of vertices, called arcs, with exactly αi vertices from Ui, such that any Σ1kαi subset 1kUi of 1kUi, E contains exactly one of the (Σ1k αi)! Σ1kαi-tuples whose entries belong to 1kUi. We obtain necessary and sufficient conditions for k lists of non-negative integers in non-decreasing order to be the losing score lists and to be the score lists of some k-partite hypertournament.