On the Bezrukavnikov-Kaledin quantization of symplectic varieties in characteristic $p$

Published 16 Nov 2020 in math.AG, math.RT, and math.SG | (2011.08259v1)

Abstract: We prove that after inverting the Planck constant $h$ the Bezrukavnikov-Kaledin quantization $(X, \mathcal{O}_h)$ of symplectic variety $X$ in characteristic $p$ is Morita equivalent to a certain central reduction of the algebra of differential operators on $X$.

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