On the category O for generalized Weyl algebras
Abstract
Let H(R, φ, z) be a generalized Weyl algebra associated with a ring R, its central element z∈ Z(R) and an automorphism φ, such that for some l ≥ 1, φl(z)-z is nilpotent and (z,φi(z))=R for all 0<i<l. We prove that the category O over H(R, z,φ) is equivalent to the category O over its l-th twist the generalized Weyl algebra H(R, z,φl). This result is significantly more general than the corresponding one for the Weyl algebra over Z/pnZ.
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