Coordinate sum and difference sets of $d$-dimensional modular hyperbolas

TL;DR

This paper extends the study of coordinate sum and difference sets from 2-dimensional modular hyperbolas to higher dimensions, analyzing their sizes and dominance properties in a generalized setting.

Contribution

It generalizes previous results on 2D modular hyperbolas to d-dimensional cases, exploring coordinate sum dominance in higher dimensions.

Findings

Extended size analysis of coordinate sum and difference sets to d-dimensional hyperbolas.

Identified conditions for coordinate sum dominance in higher-dimensional modular hyperbolas.

Provided formulas and bounds for the sizes of sum and difference sets in the generalized setting.

Abstract

Many problems in additive number theory, such as Fermat's last theorem and the twin prime conjecture, can be understood by examining sums or differences of a set with itself. A finite set $A \subset \mathbb{Z}$ is considered sum-dominant if $|A+A|>|A-A|$. If we consider all subsets of ${0, 1, ..., n-1}$, as $n\to\infty$ it is natural to expect that almost all subsets should be difference-dominant, as addition is commutative but subtraction is not; however, Martin and O'Bryant in 2007 proved that a positive percentage are sum-dominant as $n\to\infty$. This motivates the study of "coordinate sum dominance". Given $V \subset (\Z/n\Z)^2$, we call $S:={x+y: (x,y) \in V}$ a coordinate sumset and $D:=\{x-y: (x,y) \in V\}$ a coordinate difference set, and we say $V$ is coordinate sum dominant if $|S|>|D|$. An arithmetically interesting choice of $V$ is $\bar{H}_2(a;n)$, which is the reduction modulo $n$ of the modular hyperbola $H_2(a;n) := {(x,y): xy \equiv a \bmod n, 1 \le x,y < n}$. In 2009, Eichhorn, Khan, Stein, and Yankov determined the sizes of $S$ and $D$ for $V=\bar{H}_2(1;n)$ and investigated conditions for coordinate sum dominance. We extend their results to reduced $d$-dimensional modular hyperbolas $\bar{H}_d(a;n)$ with $a$ coprime to $n$.