A remark on the Hochschild-Kostant-Rosenberg theorem in characteristic p
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characteristichochschild-kostant-rosenbergproperresultsmooththeoremwhenyekutieli
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We prove a Hochschild-Kostant-Rosenberg decomposition theorem for smooth proper schemes $X$ in characteristic $p$ when $\dim X\leq p$. The best known previous result of this kind, due to Yekutieli, required $\dim X<p$. Yekutieli's result follows from the observation that the denominators appearing in the classical proof of HKR do not divide $p$ when $\dim X<p$. Our extension to $\dim X=p$ requires a homological fact: the Hochschild homology of a smooth proper scheme is self-dual.
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Derived invariants from topological Hochschild homology
Slope numbers, domino numbers, and Hodge-Witt numbers from Hodge-Witt and crystalline cohomology are derived invariants in positive characteristic, restricting Hodge numbers of derived equivalent varieties.
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