Tensor Triangular Geometry for Quantum Groups

Abstract

Let g be a complex simple Lie algebra and let Uζ( g) be the corresponding Lusztig Z[q,q-1]-form of the quantized enveloping algebra specialized to an root of unity. Moreover, let (Uζ( g)) be the braided monoidal category of finite-dimensional modules for Uζ( g). In this paper we classify the thick tensor ideals of (Uζ( g)) and compute the prime spectrum of the stable module category associated to mod(Uζ( g)) as defined by Balmer.