BGG category for the quantum Schr\"odinger algebra

Abstract

In this paper, we study the BGG category O for the quantum Schr\"odinger algebra Uq(s), where q is a nonzero complex number which is not a root of unity. If the central charge z≠ 0, using the module B z over the quantum Weyl algebra Hq, we show that there is an equivalence between the full subcategory O[ z] consisting of modules with the central charge z and the BGG category O(sl2) for the quantum group Uq(sl2). In the case that z=0, we study the subcategory A consisting of finite dimensional Uq(s)-modules of type 1 with zero action of Z. Motivated by the ideas in DLMZ, Mak, we directly construct an equivalent functor from A to the category of finite dimensional representations of an infinite quiver with some quadratic relations. As a corollary, we show that the category of finite dimensional Uq(s)-modules is wild.