Computing Crystalline Cohomology and p-Divisible Groups for Curves over Finite Fields
Abstract
Let X be a smooth projective curve over a finite field of characteristic p. We describe and implement a practical algorithm for computing the p-divisible group Jac(X)[p∞] via computing its Dieudonn\'e module, or equivalently computing the Frobenius and Verschiebung operators on the first crystalline cohomology of X. We build on Tuitman's p-adic point counting algorithm, which computes the rigid cohomology of X and requires a ``nice'' lift of X to be provided.
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