Normalizers of Primitive Permutation Groups

Abstract

Let G be a transitive normal subgroup of a permutation group A of finite degree n. The factor group A/G can be considered as a certain Galois group and one would like to bound its size. One of the results of the paper is that |A/G| < n if G is primitive unless n = 34, 54, 38, 58, or 316. This bound is sharp when n is prime. In fact, when G is primitive, |Out(G)| < n unless G is a member of a given infinite sequence of primitive groups and n is different from the previously listed integers. Many other results of this flavor are established not only for permutation groups but also for linear groups and Galois groups.