Dense sets of integers with prescribed representation functions

Abstract

Let A be a set of integers and let h ≥ 2. For every integer n, let rA, h(n) denote the number of representations of n in the form n=a1+...+ah, where a1,...,ah belong to the set A, and a1≤ ... ≤ ah. The function rA,h from the integers Z to the nonnegative integers N0 U ∞ is called the representation function of order h for the set A. We prove that every function f from Z to N0 U ∞ satisfying liminf|n|->∞ f (n)≥ g is the representation function of order h for some sequence A of integers, and that A can be constructed so that it increases "almost" as slowly as any given Bh[g] sequence. In particular, for every epsilon >0 and g ≥ g(h,epsilon), we can construct a sequence A satisfying rA,h=f and A(x) x(1/h)-epsilon.