Schur-Weyl duality for Deligne categories II: the limit case

Abstract

This paper is a continuation of a previous paper of the author, which gave an analogue to the classical Schur-Weyl duality in the setting of Deligne categories. Given a finite-dimensional unital vector space V (a vector space V with a chosen non-zero vector 1), we constructed a complex tensor power of V: an Ind-object of the Deligne category Rep(St) which is a Harish-Chandra module for the pair (gl(V), P1), where P1 ⊂ GL(V) is the mirabolic subgroup preserving the vector 1. This construction allowed us to obtain an exact contravariant functor SWt, V from the category Repab(St) (the abelian envelope of the category Rep(St)) to a certain localization of the parabolic category O associated with the pair (gl(V), P1). In this paper, we consider the case when V = C∞. We define the appropriate version of the parabolic category O and its localization, and show that the latter is equivalent to a "restricted" inverse limit of categories Opt,CN with N tending to infinity. The Schur-Weyl functors SWt, CN then give an anti-equivalence between this category and the category Repab(St). This duality provides an unexpected tensor structure on the category Op∞t, C∞.