Rank 2 Local Systems, Barsotti-Tate Groups, and Shimura Curves
Abstract
We develop a descent criterion for K-linear abelian categories. Using recent advances in the Langlands correspondence due to Abe, we build a correspondence between certain rank 2 local systems and certain Barsotti-Tate groups on complete curves over a finite field. We conjecture that such Barsotti-Tate groups "come from" a family of fake elliptic curves. As an application of these ideas, we provide a criterion for being a Shimura curve over Fq. Along the way, we formulate a conjecture on the field-of-coefficients of certain compatible systems.
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