Lifting free modules to generalized Weyl algebras

Abstract

We study modules over a generalized Weyl algebra R(σ,a) which are free when restricted to the base ring R. When R is an integral domain, we construct all such finite-rank modules up to isomorphism, leading to new simple modules over a variety of algebras. In particular, we show that free modules that have rank 1 over R can be parametrized as Vp where p is a divisor of a. We give simplicity criteria for Vp and, additionally, when R is a PID, provide a complete combinatorial description of the submodule structure of Vp and of the weight modules occurring as subquotients. We also show that, under some mild conditions on R(σ,a), there exist simple R-free modules of arbitrary finite rank. We apply our results to sl2 in order to construct new families of simple Cartan-free modules of all finite ranks.

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