There are no excess one digraphs

Abstract

A digraph G is k-geodetic if for any pair u,v ∈ V(G) there is at most one u,v-walk of length not exceeding k. The order of a k-geodetic digraph with minimum out-degree d is bounded below by the directed Moore bound M(d,k) = 1 + d + d2+ ·s +dk. It is known that the Moore bound cannot be achieved for d,k ≥ 2. A k-geodetic digraph with minimum degree d and order one greater than the Moore bound has excess one. In this paper we prove a conjecture that no excess one digraphs exist for d,k ≥ 2, thus complementing the result of Bannai and Ito on the non-existence of undirected graphs with excess one.

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