Slopes of $F$-isocrystals over abelian varieties

Published 15 Jan 2021 in math.AG and math.NT | (2101.06257v2)

Abstract: We prove that an $F$-isocrystal over an abelian variety defined over a perfect field of positive characteristic has constant slopes. This recovers and extends a theorem of Tsuzuki for abelian varieties over finite fields. Our proof exploits the theory of monodromy groups of convergent isocrystals.

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Authors (1)

Marco D'Addezio

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