Multipartite tournaments in which any two vertices have an (i,j)-step common out-neighbor

Abstract

We say that a digraph D is (i,j)-step competitive if any two vertices have an (i,j)-step common out-neighbor in D and that a graph G is (i,j)-step competitively orientable if there exists an (i,j)-step competitive orientation of G. In [Choi et al. Competitively orientable complete multipartite graphs. Discrete Mathematics, 345(9):112950, 2022], Choi et al. introduce the notion of competitive digraph and completely characterize competitively orientable complete multipartite graphs in terms of the sizes of its partite sets. Here, a competitive digraph means a (1,1)-step competitive digraph. In this paper, the result of Choi et al. has been extended to a general characterization of (i,j)-step competitively orientable complete multipartite graphs.

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