On the Automorphisms of Token Graphs Generated by 2-cuts with the Same Neighbours

Abstract

Let G be a connected graph on n vertices and 1 k n-1 an integer. The k-token graph of G is the graph Fk(G) whose vertices are all the k-subsets of vertices of G, two of which are adjacent whenever their symmetric difference is an edge of G. Every automorphism of G induces an automorphism of Fk(G) in a natural way. Suppose that S:=\x,y\ is a cut set of G, such that x and y have the same neighbours in G \x,y\. In this paper we show that there exist a large number of automorphisms of Fk(G) defined by S that are not induced by automorphisms of G. We also describe the group produced by all such 2-cuts of G.