The canonical global quantization of symplectic varieties in characteristic p
Abstract
Let X be a smooth symplectic variety over a field k of characteristic p>2 equipped with a restricted structure, which is a class [η] ∈ H0(X, 1X/d OX) whose de Rham differential equals the symplectic form. In this paper we construct a functorial in (X, [η]) formal quantization of the category QCoh(X) of quasi-coherent sheaves on X. We also construct its natural extension to a quasi-coherent sheaf of categories QCohh on the product X(1) × S of the Frobenius twist of X and the projective line S= P1, viewed as the one-point compactification of Spec\ \! k[h]. Its global sections over X(1) × \0\ is the category of quasi-coherent sheaves on X. If X is affine, QCohh, restricted to X(1)× Spf \ \! k[[h]], is equivalent to the category of modules over the distinguished "Frobenius-constant" quantization of (X,[η]) defined by Bezrukavnikov and Kaledin.
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