On generalized Fuchs theorem over relative $p$-adic polyannuli
Abstract
In this paper, we study coherent locally free (logarithmic-)-modules on relative -adic polyannuli satisfying the Robba condition and prove several criteria for decomposition of such (logarithmic-)-modules. Firstly we prove the -adic Fuchs theorem for absolute logarithmic -modules where the exponents have non-Liouville differences, which generalizes a result of Shiho. Secondly, we prove a generalized -adic Fuchs theorem for relative -modules which are semi-constant on fibers. We also prove a generalized -adic Fuchs theorem for absolute -modules, when the derivation on the base has some specific form. In the appendix, we prove the coincidence of two definitions of exponents due to Christol-Mebkhout and Dwork and prove that the set of exponents forms exactly one weak equivalence class.
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Cite
@article{arxiv.2502.05528,
title = {On generalized Fuchs theorem over relative $p$-adic polyannuli},
author = {Peiduo Wang},
journal= {arXiv preprint arXiv:2502.05528},
year = {2025}
}
Comments
51 pages