On a Problem of Wang Concerning the Hamiltonicity of Bipartite Digraphs

Abstract

R. Wang (Discrete Mathematics and Theoretical Computer Science, vol. 19(3), 2017) proposed the following problem. Problem. Let D be a strongly connected balanced bipartite directed graph of order 2a≥ 8. Suppose that d(x)≥ 2a-k, d(y)≥ a+k or d(y)≥ 2a-k, d(x)≥ a+k for every pair of vertices x,y with a common out-neighbour, where 2 ≤ k≤ a/2. Is D Hamiltonian? In this paper, we prove that if a digraph D satisfies the conditions of this problem, then (i) D contains a cycle factor, (ii) for every vertex x∈ V(D) there exists a vertex y∈ V(D) such that x and y have a common out-neighbour.