Effective Methods for Diophantine Finiteness
Abstract
Let be a number field, and let be its ring of -integers. Recently, Lawrence and Venkatesh proposed a general strategy for proving the Shafarevich conjecture for the fibres of a smooth projective family defined over . To carry out their strategy, one needs to be able to decide whether the algebraic monodromy group of any positive-dimensional geometrically irreducible subvariety is "large enough", in the sense that a certain orbit of in a variety of Hodge flags has dimension bounded from below by a certain quantity. In this article we give an effective method for deciding this question. Combined with the effective methods of Lawrence-Venkatesh for understanding semisimplifications of global Galois representations using -adic Hodge theory, this gives a fully effective strategy for solving Shafarevich-type problems for arbitrary families .
Cite
@article{arxiv.2110.14829,
title = {Effective Methods for Diophantine Finiteness},
author = {David Urbanik},
journal= {arXiv preprint arXiv:2110.14829},
year = {2021}
}
Comments
Preliminary version. The author plans an extended version of this article with explicit computations to appear sometime next year