Quantum tilting modules over local rings

Abstract

We show that tilting modules for quantum groups over local Noetherian domains exist and that the indecomposable tilting modules are parametrized by their highest weight. For this we introduce a model category X= X A(R) associated with a Noetherian Z[v,v-1]-domain A and a root system R. We show that if A is of quantum characteristic 0, the model category contains all U A-modules that admit a Weyl filtration. If A is in addition local, we study torsion phenomena in the model category. This leads to a construction of torsion free objects in X. We show that these correspond to tilting modules for the quantum group associated with A and R.

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