Specht filtrations and tensor spaces for the Brauer algebra

Abstract

Let m, n∈ N. In this paper we study the right permutation action of the symmetric group S2n on the set of all the Brauer n-diagrams. A new basis for the free Z-module Bn spanned by these Brauer n-diagrams is constructed, which yields Specht filtrations for Bn. For any 2m-dimensional vector space V over a field of arbitrary characteristic, we give an explicit and characteristic free description of the annihilator of the n-tensor space V n in the Brauer algebra Bn(-2m). In particular, we show that it is a S2n-submodule of Bn(-2m).

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