Slopes of indecomposable $F$-isocrystals

We prove that for an indecomposable convergent or overconvergent $F$-isocrystal on a smooth irreducible variety over a perfect field of characteristic $p$, the gap between consecutive slopes at the generic point cannot exceed $1$. (This may be thought of as a crystalline analogue of the following consequence of Griffiths transversality: for an indecomposable variation of complex Hodge structures, there cannot be a gap between non-zero Hodge numbers.) As an application, we deduce a refinement of a result of V. Lafforgue on the slopes of Frobenius of an $\ell$-adic local system.

We also prove similar statements for $G$-local systems (crystalline and $\ell$-adic ones), where $G$ is a reductive group.

We translate our results on local systems into properties of the $p$-adic absolute values of the Hecke eigenvalues of a cuspidal automorphic representation of a reductive group over the adeles of a global field of characteristic $p \gt 0$.

Keywords

$F$-isocrystal, local system, slope, Newton polygon, Frobenius, hypergeometric sheaf

2010 Mathematics Subject Classification

Primary 11F80, 14F30. Secondary 11F70, 14G15.

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Received 26 January 2017

Published 14 September 2018