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Regulators in the arithmetic of function fields

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Gazda,  Quentin       
Max Planck Institute for Mathematics, Max Planck Society;

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2207.03461.pdf
(Preprint), 669KB

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Citation

Gazda, Q. (submitted). Regulators in the arithmetic of function fields.


Cite as: https://hdl.handle.net/21.11116/0000-0010-3BAF-8
Abstract
As a natural sequel for the study of A-motivic cohomology, initiated in [Gaz], we develop a notion of regulator for rigid analytically trivial Anderson A-motives. In accordance with the conjectural number field picture, we define it as the morphism at the level of extension modules induced by the exactness of the Hodge-Pink realization functor. The purpose of this text is twofold: we first prove a finiteness result for A-motivic cohomology and, under a weight assumption, we then show that the source and the target of regulators have the same dimension. It came as a surprise to the author that the image of this regulator might not have full rank, preventing the analogue of a renowned conjecture of Beilinson to hold in our setting.