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Hauptverfasser: Poineau, Jérôme, Pulita, Andrea
Format: Preprint
Veröffentlicht: 2024
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Online-Zugang:https://arxiv.org/abs/2412.02341
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author Poineau, Jérôme
Pulita, Andrea
author_facet Poineau, Jérôme
Pulita, Andrea
contents In our previous works we proved a finiteness property of the radii of convergence functions associated with a vector bundle with connection on $p$-adic analytic curves. We showed that the radii are locally constant functions outside a locally finite graph in the curve, called controlling graph. In this paper we refine that finiteness results by giving a bound on the size of the controlling graph in terms of the geometry of the curve and the rank of the module. This is based on super-harmonicity properties of radii of convergence and partial heights of the Newton polygon. Under suitable assumptions, we relate the size of the controlling graph associated with the total height of the convergence Newton polygon to the Euler characteristic in the sense of de Rham cohomology.
format Preprint
id arxiv_https___arxiv_org_abs_2412_02341
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle The convergence Newton polygon of a $p$-adic differential equation IV : controlling graphs
Poineau, Jérôme
Pulita, Andrea
Number Theory
In our previous works we proved a finiteness property of the radii of convergence functions associated with a vector bundle with connection on $p$-adic analytic curves. We showed that the radii are locally constant functions outside a locally finite graph in the curve, called controlling graph. In this paper we refine that finiteness results by giving a bound on the size of the controlling graph in terms of the geometry of the curve and the rank of the module. This is based on super-harmonicity properties of radii of convergence and partial heights of the Newton polygon. Under suitable assumptions, we relate the size of the controlling graph associated with the total height of the convergence Newton polygon to the Euler characteristic in the sense of de Rham cohomology.
title The convergence Newton polygon of a $p$-adic differential equation IV : controlling graphs
topic Number Theory
url https://arxiv.org/abs/2412.02341