Brauer algebras, symplectic Schur algebras and Schur-Weyl duality

Abstract

In this paper we prove Schur-Weyl duality between the symplectic group and Brauer algebra over an arbitrary infinite field K. We show that the natural homomorphism from the Brauer algebra Bn(-2m) to the endomorphism algebra of tensor space (K2m) n as a module over the symplectic similitude group GSp2m(K) (or equivalently, as a module over the symplectic group Sp2m(K)) is always surjective. Another surjectivity, that of the natural homomorphism from the group algebra for GSp2m(K) to the endomorphism algebra of (K2m) n as a module over Bn(-2m), is derived as an easy consequence of S.~Oehms' results [S. Oehms, J. Algebra (1) 244 (2001), 19--44].

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