Cospectral mates for the union of some classes in the Johnson association scheme

Abstract

Let n≥ k≥ 2 be two integers and S a subset of \0,1,…,k-1\. The graph JS(n,k) has as vertices the k-subsets of the n-set [n]=\1,…,n\ and two k-subsets A and B are adjacent if |A B|∈ S. In this paper, we use Godsil-McKay switching to prove that for m≥ 0, k≥ (m+2,3) and S = \0, 1, ..., m\, the graphs JS(3k-2m-1,k) are not determined by spectrum and for m≥ 2, n≥ 4m+2 and S = \0,1,...,m\ the graphs JS(n,2m+1) are not determined by spectrum. We also report some computational searches for Godsil-McKay switching sets in the union of classes in the Johnson scheme for k≤ 5.