Digraphs in which every t vertices have exactly λ common out-neighbors

Abstract

We say that a digraph is a (t,λ)-liking digraph if every t vertices have exactly λ common out-neighbors. In 1975, Plesn\'ik [Graphs with a homogeneity, 1975. Glasnik Mathematicki 10:9-23] proved that any (t,1)-liking digraph is the complete digraph on t+1 vertices for each t≥ 3. Choi et al. [A digraph version of the Friendship Theorem, 2025. Discrete mathematics, 348(1), 114238] showed that a (2,1)-liking digraph is a fancy wheel digraph or a k-diregular digraph for some positive integer k. In this paper, we extend these results by completely characterizing the (t,λ)-liking digraphs with t ≥ λ+2 and giving some equivalent conditions for a (t,λ)-liking digraph being a complete digraph on t+λ vertices.

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