Turan problems for k-geodetic digraphs

Abstract

A digraph G is k-geodetic if for any pair of (not necessarily distinct) vertices u,v ∈ V(G) there is at most one walk of length ≤ k from u to v in G. In this paper we determine the largest possible size of a k-geodetic digraph with given order. We then consider the more difficult problem of the largest size of a strongly-connected k-geodetic digraph with given order, solving this problem for k = 2 and giving a construction which we conjecture to be extremal for larger k. We close with some results on generalised Tur\'an problems for the number of directed cycles and paths in k-geodetic digraphs.