Braided tensor products and polynomial invariants for the quantum queer superalgebra

Abstract

The classical invariant theory for the queer Lie superalgebra qn investigates its invariants in the supersymmetric algebra Us,lr,k:=Sym(V r (V) k V* s (V*) l ), where V=Cn|n is the natural supermodule, V* is its dual and is the parity reversing functor. This paper aims to construct a quantum analogue Br,ks,l of Us,lr,k and to explore the quantum queer superalgebra Uq(qn)-invariants in Br,ks,l. The strategy involves braided tensor products of the quantum analogues Ar,n, Ak,n of the supersymmetric algebras Sym(V r), Sym((V) k), and their dual partners As,n, and Al,n. These braided tensor products are defined using explicit braiding operator due to the absence of a universal R-matrix for Uq(qn). Furthermore, we obtain an isomorphism between the braided tensor product Ar,nAk,n and Ar+k,n, an isomorphism between Ak,n and Ak,n, as well as the corresponding isomorphisms for their dual parts. Consequently, the Uq(qn)-supermodule superalgebra Br,ks,l is identified with Br+k,0s+l,0. This allows us to obtain a set of generators of Uq(qn)-invariants in Br,ks,l.