On Cn-irregular oriented graphs

Abstract

Let F and G be simple finite oriented graphs (without symmetric arcs). A graph G is called F-irregular if any two distinct vertices in G belong to a different number of subgraphs of G isomorphic to F. In this paper, we investigate the problem of the existence of Cn-irregular graphs, where Cn is an oriented cycle of order n (a strongly connected oriented graph that is formed from a simple undirected cycle Cn on n vertices by orienting each of its edges). For every integer n 3, we prove that there exists an infinite family of Cn-irregular graphs. In addition, we show that the order of a non-trivial C3-irregular graph can be any integer not less than 10 and no others. We also construct C4-irregular graphs of any order at least 7 and prove that there are no non-trivial C4-irregular graphs of order less than 7.