Infinite-level Fock spaces, crystal bases, and tensor product of extremal weight modules of type A+∞

Abstract

We study the category C generated by extremal weight modules over Uq(gl>0). We show that C is a tensor category, and give an explicit description of the socle filtration of tensor product of any two extremal weight modules. This follows from the study of Fock space F∞ M of infinite level, which has commuting actions of a parabolic q-boson algebra and Up(gl>0) with p=-q-1. It contains a (semisimple) limit of the fermionic Fock space Fn of level n, which has a q-analogue of Howe duality often called level-rank duality. To describe the socle filtration of F∞ M, we introduce the notion of a saturated crystal valuation, whose existence was observed for example in the embedding of an extremal weight module into a tensor product of fundamental weight modules of affine type due to Kashiwara and Beck-Nakajima.