Picard groups of punctured spectra of dimension three local hypersurfaces are torsion-free
Abstract
Let (R,m) be a local ring and UR=Spec(R) -m be the punctured spectrum of R. Gabber conjectured that if R is a complete intersection of dimension 3, then the abelian group Pic(UR) is torsion-free. In this note we prove Gabber's statement for the hypersurface case. We also point out certain connections between Gabber's Conjecture, Van den Bergh's notion of non-commutative crepant resolutions and some well-studied questions in homological algebra over local rings.
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