Schur-Weyl Reciprocity for the Hecke Algebra of ( Z/r Z) Sn
Abstract
The purpose of this paper is to give a reciprocity between Uq(h) and Hn,r, the Hecke algebra of ( Z / r Z) Sn introduced by Ariki and Koike. Let K= Q(q,u1,… ,ur) be the field of rational funcitons in variables q,u1,… ,ur. We adopt K as the base field for both the quantized universal enveloping algebra Uq(glr) and the Hecke algebra Hn. We denote by Uq(h) the K-subalgebra of Uq(glr) generated by qEii\;'s (1 i r). In this paper, we show that the commutant of Uq(h) in End((Kr) n) is isomorphic to a quotient of Hn,r. We also determine the irreducible decomposition of (Kr) n under the action of Hn,r. As a consequence, we obtain the reciprocity for Uq(h) and Hn,r.
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