PI-eigenfunctions of the Star graphs

Abstract

We consider the symmetric group Symn,\,n≥slant 2, generated by the set S of transpositions (1~i),\,2 ≤slant i ≤slant n, and the Cayley graph Sn=Cay(Symn,S) called the Star graph. For any positive integers n≥slant 3 and m with n > 2m, we present a family of PI-eigenfunctions of Sn with eigenvalue n-m-1. We establish a connection of these functions with the standard basis of a Specht module. In the case of largest non-principal eigenvalue n-2 we prove that any eigenfunction of Sn can be reconstructed by its values on the second neighbourhood of a vertex.