Quasi-Gorenstein (Normal) Finite Covers in Arbitrary Characteristic
Abstract
We show that any complete local (normal) domain admits a module-finite quasi-Gorenstein normal (complete local) domain extension. In the geometric vein, we show that any normal projective variety X over a field admits a finite surjective morphism Y→ X from a normal quasi-Gorenstein projective variety Y. Notably, our results resolve the previously open case for residual characteristic two.
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