Schur-Weyl duality for tensor powers of the Burau representation

Abstract

Artin's braid group Bn is generated by σ1, …, σn-1 subject to the relations \[ σi σi+1 σi = σi+1 σi σi+1, σiσj = σj σi if |i-j|>1. \] For complex parameters q1,q2 such that q1q2 0, the group Bn acts on the vector space E = Σi C ei with basis e1, …, en by gather* σi · ei = (q1+q2)ei + q1ei+1, σi · ei+1 = -q2ei, \\ σi · ej = q1 ej if j i,i+1. gather* This representation is (a slight generalization of) the Burau representation. If q = -q2/q1 is not a root of unity, we show that the algebra of all endomorphisms of E r commuting with the Bn-action is generated by the place-permutation action of the symmetric group Sr and the operator p1, given by \[ p1(ej1 ej2 ·s ejr) = qj1-1 \, Σi=1n ei ej2 ·s ejr . \] Equivalently, as a (C Bn, P'r([n]q))-bimodule, E r satisfies Schur--Weyl duality, where P'r([n]q) is a certain subalgebra of the partition algebra Pr([n]q) on 2r nodes with parameter [n]q = 1+q+·s + qn-1, isomorphic to the semigroup algebra of the "rook monoid" studied by W. D. Munn, L. Solomon, and others.