English

Rational points and rational moduli spaces

Number Theory 2025-02-25 v2 Algebraic Geometry

Abstract

Let XX be a variety over Q\mathbb Q. We introduce a geometric non-degenerate criterion for XX using moduli spaces MM over Q\mathbb Q of abelian varieties. If XX is non-degenerate, then we construct via MM an open dense moduli space UXU\subseteq X whose forgetful map defines a Parsin construction for U(Q)U(\mathbb Q). For example if MM is a Hilbert modular variety then UU is a coarse Hilbert moduli scheme and XX is non-degenerate iff a projective model YMˉY\subset \bar{M} of XX over Q\mathbb Q contains no singular points of the minimal compactification Mˉ\bar{M}. We motivate our constructions when MM is a rational variety over Q\mathbb Q with dim(M)>dim(X)\dim(M)>\dim(X). We study various geometric aspects of the non-degenerate criterion and we deduce arithmetic applications: If XX is non-degenerate, then U(Q)U(\mathbb Q) 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 MM is a coarse Hilbert moduli scheme, we use this strategy to explicitly bound the height and the number of xU(Q)x\in U(\mathbb Q) if XX is non-degenerate. We illustrate our approach when MM is the Hilbert modular surface given by the classical icosahedron surface studied by Clebsch, Klein and Hirzebruch. For any curve XX over Q\mathbb Q, we construct and study explicit projective models YMˉY\subset\bar{M} called ico models. If XX is non-degenerate, then we give via YY an effective Parsin construction and an explicit Weil height bound for xU(Q)x\in U(\mathbb Q). As most ico models are non-degenerate and XUX\setminus U is controlled, this establishes the effective Mordell conjecture for large classes of (explicit) curves over Q\mathbb Q. We also solve the ico analogue of the generalized Fermat problem by combining our height bounds with Diophantine approximations.

Keywords

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

R2 v1 2026-06-28T21:22:34.380Z