Dual partially harmonic tensors and Brauer-Schur-Weyl duality

Abstract

Let V be a 2m-dimensional symplectic vector space over an algebraically closed field K. Let n(f) be the two-sided ideal of the Brauer algebra n(-2m) over K generated by e1e3... e2f-1, where 0≤ f≤ [n/2]. Let HTf n be the subspace of partially harmonic tensors of valence f in V n. In this paper, we prove that f n and KSp(V)(V n/V nn(f)) are both independent of K, and the natural homomorphism from n(-2m)/n(f) to KSp(V)(V n/V nn(f)) is always surjective. We show that HTf n has a Weyl filtration and is isomorphic to the dual of V nn(f)/V nn(f+1) as a Sp(V)-(n(-2m)/n(f+1))-bimodule. We obtain a Sp(V)-n-bimodules filtration of V n such that each successive quotient is isomorphic to some ∇() zg,n with n-2g, ()≤ m and 0≤ g≤ [n/2], where ∇() is the co-Weyl module associated to and zg, is an explicitly constructed maximal vector of weight . As a byproduct, we show that each right n-module zg,n is integrally defined and stable under base change.