Artin-Schelter Gorenstein property of Hopf Galois extensions
Abstract
This paper investigates the homological properties of the faithfully flat Hopf Galois extension A ⊂eq B. It establishes that when B is a noetherian affine PI algebra and A is AS Gorenstein, B inherits the AS Gorenstein property. Furthermore, we demonstrate that injective dimension serves as a monoidal invariant for AS Gorenstein Hopf algebras. Specifically, if two such Hopf algebras have equivalent monoidal categories of comodules, then their injective dimensions are equal.
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