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Bibliographic Details
Main Authors: Guo, Yanqiu, Ilyin, Michael
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2309.10971
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Table of Contents:
  • This paper is inspired by Richards' work on large gaps between sums of two squares [10]. It is shown in [10] that there exist arbitrarily large values of $λ$ and $μ$, where $μ\geq C \log λ$, such that intervals $[λ, \,λ+ μ]$ do not contain any sums of two squares. Geometrically, these gaps between sums of two squares correspond to annuli in $\mathbb R^2$ that do not contain any integer lattice points. A major objective of this paper is to investigate the sparse distribution of integer lattice points within annular regions in $\mathbb R^2$. Specifically, we establish the existence of annuli $\{x\in \mathbb R^2: λ\leq |x|^2 \leq λ+ κ\}$ with arbitrarily large $λ$ and $κ\geq C λ^s$ for $0<s<\frac{1}{4}$, satisfying that any two integer lattice points within any one of these annuli must be sufficiently far apart. This result is sharp, as such a property ceases to hold at and beyond the threshold $s=\frac{1}{4}$. Furthermore, we extend our analysis to include the sparse distribution of lattice points in spherical shells in $\mathbb R^3$.