The first fundamental theorem of invariant theory for the quantum queer superalgebra

Abstract

The classical invariant theory for the queer Lie superalgebra is an investigation of the U(qn)-invariant sub-superalgebra of the symmetric superalgebra Sym(V r V* s) for V=Cn|n. We establish the first fundamental theorem of invariant theory for the quantum queer superalgebra Uq(qn). The key ingredient is a quantum analog Or,s of the symmetric superalgebra Sym(V r V* s) that is created as a braided tensor product of a quantization Ar,n of Sym(V r) and a quantization As,n of Sym(V* s). Since the quantum queer superalgebra Uq(qn) is not quasi-triangular, our braided tensor product is created via an explicit intertwining operator instead of the universal R-matrix.