Counting rational points near manifolds: a refined estimate, a conjecture and a variant

TL;DR

This paper refines bounds on counting rational points near manifolds, formulates a conjecture in codimension 2, and supports it through a Gaussian rational variant, advancing understanding in Diophantine approximation.

Contribution

It improves existing bounds for rational points near manifolds under curvature conditions and introduces a new conjecture for codimension 2 cases, with supporting evidence.

Findings

Improved bounds for rational points near manifolds.

Formulated a conjecture for codimension 2 cases.

Provided evidence via Gaussian rational variant.

Abstract

Refining an argument of the second author, we improve the known bounds for the number of rational points near a submanifold of $\mathbb{R}^d$ of intermediate dimension under a natural curvature condition. Furthermore, in the codimension $2$ case we formulate a conjecture concerning this count. The conjecture is motivated in part by interpreting certain codimension $2$ submanifolds of $\mathbb{R}^{2m+2}$ as complex hypersurfaces in $\mathbb{C}^{m+1}$ and using the complex structure to provide a natural reformulation of the curvature condition. Finally, we provide further evidence for the conjecture by proving a natural variant for $n \geq 2$ in which rationals are replaced with Gaussian rationals.