Approaching quantum queer supergroups using finite dimensional superalgebras (Preliminary version)

Abstract

The idea of using a sequence of finite dimensional algebras to approach a quantum linear group (i.e., a quantum gln) was first introduced by Beilinson-Lusztig-MacPherson [BLM]. In their work, the algebras are convolution algebras of some finite partial flag varieties whose certain structure constants relative to the orbital basis satisfy a stabilization property. This property leads to the definition of an infinite dimensional idempotented algebra. Finally, taking a limit process yields a new realization for the quantum gln. Since then, this work has been modified [DF2] and generalized to quantum affine gln (see [GV, L] for the geometric approach and [DDF, DF] for the algebraic approach and a new realization) and quantum super glm|n [DG], and, more recently, to convolution algebras arising from type B/C geometry and i-quantum groups U and U; see [BKLW, DWu1, DWu2]. This paper extends the algebraic approach to the quantum queer supergroup Uv(qn) via finite dimensional queer q-Schur superalgebras.