On the Second Eigenvalue of Certain Cayley Graphs on the Symmetric Group

Abstract

In 2020, Siemons and Zalesski determined the second eigenvalue of the Cayley graph \(\Gamma _{n,k} = {{\,\textrm{Cay}\,}}({{\,\textrm{Sym}\,}}(n), C(n,k))\) for \(k = 0\) and \(k=1\), where C(n, k) is the conjugacy class of \((n-k)\)-cycles. In this paper, it is proved that for any \(n\ge 3\) and \(k\in {\mathbb {N}}\) relatively small compared to n, the second eigenvalue of \(\Gamma _{n,k}\) is the eigenvalue afforded by the irreducible character of \({{\,\textrm{Sym}\,}}(n)\) that corresponds to the partition \([n-1,1]\). As a byproduct of our method, the result of Siemons and Zalesski when \(k \in \{0,1\}\) is retrieved. Moreover, we prove that the second eigenvalue of \(\Gamma _{n,n-5}\) is also equal to the eigenvalue afforded by the irreducible character of the partition \([n-1,1]\).