Fixity of elusive groups and the polycirculant conjecture

Abstract

Let G≤ Sym() be transitive. Then G is called elusive on if it has no fixed point free element of prime order. The 2-closure of G, denoted by G(2),, is the largest subgroup of Sym() whose orbits on × are the same orbits of G. G is called 2-closed on if G=G(2),. The polycirculant conjecture states that there is no 2-closed elusive group. In this paper, we study the fixity of elusive groups, where the fixity of G is the maximal number of fixed points of a non-trivial element of G. In particular, we prove that there is no 2-closed elusive solvable group of fixity at most 5, a partial answer to the polycirculant conjecture.