The representation theory of somewhere-to-below shuffles
Abstract
The *somewhere-to-below shuffles* are the elements \[ t := cyc+cyc,+1+cyc,+1,+2+·s+cyc,+1,…,n \] (for ∈ \1,2,…,n\) in the group algebra k[Sn] of the n-th symmetric group Sn. Their linear combinations are called the *one-sided cycle shuffles*. We determine the eigenvalues of the action of any one-sided cycle shuffle on any Specht module Sλ of Sn.
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