On (1,2)-step competition graphs of multipartite tournaments II

Abstract

A multipartite tournament is an orientation of a complete k-partite graph for some positive integer k≥ 3. We say that a multipartite tournament D is tight if every partite set forms a clique in the (1,2)-step competition graph, denoted by C1,2(D), of D. In the previous paper titled "On (1,2)-step competition graphs of multipartite tournaments" choi202412step we completely characterize C1,2(D) for a tight multipartite tournament D. As an extension, in this paper, we study (1,2)-step competition graphs of multipartite tournaments that are not tight, which will be called loose. For a loose multipartite tournament D, various meaningful results are obtained in terms of C1,2(D) being interval and C1,2(D) being connected.