On Hamiltonian Bypasses in Digraphs with the Condition of Y. Manoussakis

Abstract

Let D be a strongly connected directed graph of order n≥ 4 vertices which satisfies the following condition for every triple x,y,z of vertices such that x and y are non-adjacent: If there is no arc from x to z, then d(x)+d(y)+d+(x)+d-(z)≥ 3n-2. If there is no arc from z to x, then d(x)+d(y)+d-(x)+d+(z)≥ 3n-2. In [15] (J. of Graph Theory, Vol.16, No. 5, 51-59, 1992) Y. Manoussakis proved that D is Hamiltonian. In [9] it was shown that D contains a pre-Hamiltonian cycle (i.e., a cycle of length n-1) or n is even and D is isomorphic to the complete bipartite digraph with partite sets of cardinalities of n/2 and n/2. In this paper we show that D contains also a Hamiltonian bypass, (i.e., a subdigraph obtained from a Hamiltonian cycle by reversing exactly one arc) or D is isomorphic to one tournament of order 5.