Coordinate sum and difference sets of d-dimensional modular hyperbolas

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 ⊂ Z is considered sum-dominant if |A+A|>|A-A|. If we consider all subsets of 0, 1, ..., n-1, as n∞ 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∞. This motivates the study of "coordinate sum dominance". Given V ⊂ (/n)2, we call S:=x+y: (x,y) ∈ V a coordinate sumset and D:=\x-y: (x,y) ∈ V\ a coordinate difference set, and we say V is coordinate sum dominant if |S|>|D|. An arithmetically interesting choice of V is H2(a;n), which is the reduction modulo n of the modular hyperbola H2(a;n) := (x,y): xy a n, 1 x,y < n. In 2009, Eichhorn, Khan, Stein, and Yankov determined the sizes of S and D for V=H2(1;n) and investigated conditions for coordinate sum dominance. We extend their results to reduced d-dimensional modular hyperbolas Hd(a;n) with a coprime to n.