Rational points and rational moduli spaces
Abstract
Let be a variety over . We introduce a geometric non-degenerate criterion for using moduli spaces over of abelian varieties. If is non-degenerate, then we construct via an open dense moduli space whose forgetful map defines a Parsin construction for . For example if is a Hilbert modular variety then is a coarse Hilbert moduli scheme and is non-degenerate iff a projective model of over contains no singular points of the minimal compactification . We motivate our constructions when is a rational variety over with . We study various geometric aspects of the non-degenerate criterion and we deduce arithmetic applications: If is non-degenerate, then is finite by Faltings. Moreover, our constructions are made for the effective strategy which combines the method of Faltings (Arakelov, Parsin, Szpiro) with modularity and Masser-Wustholz isogeny estimates. When is a coarse Hilbert moduli scheme, we use this strategy to explicitly bound the height and the number of if is non-degenerate. We illustrate our approach when is the Hilbert modular surface given by the classical icosahedron surface studied by Clebsch, Klein and Hirzebruch. For any curve over , we construct and study explicit projective models called ico models. If is non-degenerate, then we give via an effective Parsin construction and an explicit Weil height bound for . As most ico models are non-degenerate and is controlled, this establishes the effective Mordell conjecture for large classes of (explicit) curves over . We also solve the ico analogue of the generalized Fermat problem by combining our height bounds with Diophantine approximations.
Cite
@article{arxiv.2501.17155,
title = {Rational points and rational moduli spaces},
author = {Shijie Fan and Rafael von Kanel},
journal= {arXiv preprint arXiv:2501.17155},
year = {2025}
}
Comments
v2 added more motivation/explanations for general constructions. This paper is based on the two papers (arXiv:1904.03503, arXiv:2307.06944) with Arno Kret: All three papers are now submitted, comments are always very welcome