Invariants of the orthosymplectic Lie superalgebra and super Pfaffians

Abstract

Given a complex orthosymplectic superspace V, the orthosymplectic Lie superalgebra osp(V) and general linear algebra glN both act naturally on the coordinate super-ring S(N) of the dual space of V CN, and their actions commute. Hence the subalgebra S(N) osp(V) of osp(V)-invariants in S(N) has a glN-module structure. We introduce the space of super Pfaffians as a simple glN-submodule of S(N) osp(V), give an explicit formula for its highest weight vector, and show that the super Pfaffians and the elementary (or `Brauer') OSp-invariants together generate S(N) osp(V) as an algebra. The decomposition of S(N) osp(V) as a direct sum of simple glN-submodules is obtained and shown to be multiplicity free. Using Howe's ( gl(V), glN)-duality on S(N), we deduce from the decomposition that the subspace of osp(V)-invariants in any simple gl(V)-tensor module is either 0 or 1-dimensional. These results also enable us to determine the osp(V)-invariants in the tensor powers V r for all r.