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Fourier transform for étale motivic cohomology
Published 28 Oct 2024 in math.AG | (2410.21094v1)
Abstract: In the present article, we study the integral aspects of the Fourier transform of an abelian variety $A$ over a field $k$, using \'etale motivic cohomology, following the ideas and theory given by Moonen, Polishchuk and later by Beckman and de Gaay Fortman. We prove that there exists a PD-structure over the positive degree part of the \'etale Chow ring $\text{CH}{\text{\'et}}_{>0}(A)$ with respect to the Pontryagin product.
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