Connectedness in Friends-and-Strangers Graphs of Spiders and Complements

Abstract

Let X and Y be two graphs with vertex set [n]. Their friends-and-strangers graph FS(X,Y) is a graph with vertices corresponding to elements of the group Sn, and two permutations σ and σ' are adjacent if they are separated by a transposition \a,b\ such that a and b are adjacent in X and σ(a) and σ(b) are adjacent in Y. Specific friends-and-strangers graphs such as FS(Pathn,Y) and FS(Cyclen,Y) have been researched, and their connected components have been enumerated using various equivalence relations such as double-flip equivalence. A spider graph is a collection of path graphs that are all connected to a single center point. In this paper, we delve deeper into the question of when FS(X,Y) is connected when X is a spider and Y is the complement of a spider or a tadpole.