Arbitrary orientations of Hamilton cycles in directed graphs of large minimum degree

Abstract

In 1960, Ghouila-Houri proved that every strongly connected directed graph G on n vertices with minimum degree at least n contains a directed Hamilton cycle. We asymptotically generalize this result by proving the following: every directed graph G on n vertices and with minimum degree at least (1+o(1))n contains every orientation of a Hamilton cycle, except for the directed Hamilton cycle in the case when G is not strongly connected. In fact, this minimum degree condition forces every orientation of a cycle in G of every possible length, other than perhaps the directed cycles.