Finite groups admitting a regular tournament m-semiregular representation

Abstract

For a positive integer m, a finite group G is said to admit a tournament m-semiregular representation (TmSR for short) if there exists a tournament such that the automorphism group of is isomorphic to G and acts semiregularly on the vertex set of with m orbits. Clearly, every finite group of even order does not admit a TmSR for any positive integer m, and T1SR is the well-known tournament regular representation (TRR for short). In 1986, Godsil god proved, by a probabilistic approach, that the only finite groups of odd order without a TRR are Z32 and Z33 . More recently, Du du proved that every finite group of odd order has a TmSR for every m ≥ 2. The author of du observed that a finite group of odd order has no regular TmSR when m is an even integer, a group of order 1 has no regular T3SR, and Z32 admits a regular T3SR. At the end of du, Du proposed the following problem. Problem. \ \ For every odd integer m≥ 3, classify finite groups of odd order which have a regular TmSR. The motivation of this paper is to give an answer for the above problem. We proved that if G is a finite group with odd order n>1, then G admits a regular TmSR for any odd integer m≥ 3.