Distinguishing actions of symmetric groups and related graphs

Abstract

The distinguishing number D(G,X) of an action of a group G on a set X is the least size of a partition of X such that no element of G acting nontrivially on X preserves this partition. In this paper we describe the distinguishing numbers for all actions of the symmetric group Sn, for any n≥ 3. This allows us to describe the distinguishing numbers for all graphs whose automorphism group is isomorphic with a symmetric group. Our description solves a few open problems posed by various authors in earlier papers on this topic.