On the second fundamental theorem of invariant theory for the orthosymplectic supergroup

Abstract

The first fundamental theorem of invariant theory for the orthosymplectic supergroup OSp(V) (where V has superdimension (m|2n)) in the endomorphism algebra setting states that there is a surjective algebra homomorphism Frr: Br(m-2n)→ End OSp(V)(V r) from the Brauer algebra of degree r to the endomorphism algebra of V r over OSp(V). The second fundamental theorem in this setting seeks to describe Ker Frr as a 2-sided ideal of Br(m-2n). We show that Ker Frr≠ 0 if and only if r≥ rc:=(m+1)(n+1), and present a basis and a dimension formulae for Ker Frr. As a 2-sided ideal, Ker Frr for any r rc is generated by Ker Frcrc, for which a set of generators is explicitly constructed in terms of Brauer diagrams. As applications of these results, we obtain the necessary and sufficient conditions for the endomorphism algebra End osp(V)(V r) over the orthosymplectic Lie superalgebra osp(V) to be isomorphic to Br(m-2n), and give new proofs for the main theorems in recent papers of G. Lehrer and R. Zhang on the second fundamental theorem of invariant theory for the orthogonal and symplectic groups.