Commutator nilpotency for somewhere-to-below shuffles

Abstract

Given a positive integer n, we consider the group algebra of the symmetric group Sn. In this algebra, we define n elements t1,t2,…,tn by the formula \[ t:=*cyc+*cyc,+1+*cyc,+1,+2+·s+*cyc,+1,…,n, \] where *cyc,+1,…,k denotes the cycle that sends +1+2·s k. These n elements are called the *somewhere-to-below shuffles* due to an interpretation as card-shuffling operators. In this paper, we show that their commutators [ ti,tj] =titj-tjti are nilpotent, and specifically that \[ [ ti,tj] ( n-j) /2 +1=0\ \ \ \ \ \ \ \ \ \ for any i,j∈\ 1,2,…,n\ \] and \[ [ ti,tj] j-i+1=0\ \ \ \ \ \ \ \ \ \ for any 1≤ i≤ j≤ n. \] We discuss some further identities and open questions.