Linkage and translation for tensor products of representations of simple algebraic groups and quantum groups

Abstract

Let G be either a simple linear algebraic group over an algebraically closed field of characteristic >0 or a quantum group at an -th root of unity. We define a tensor ideal of singular G-modules in the category Rep(G) of finite-dimensional G-modules and study the associated quotient category Rep(G), called the regular quotient. Our main results are a 'linkage principle' and a 'translation principle' for tensor products: Let Rep0(G) be the essential image in Rep(G) of the principal block of Rep(G). We first show that Rep0(G) is closed under tensor products in Rep(G). Then we prove that the monoidal structure of Rep(G) is governed to a large extent by the monoidal structure of Rep0(G). These results can be combined to give an external tensor product decomposition Rep(G) Ver(G) Rep0(G), where Ver(G) denotes the Verlinde category of G.