English

Every function is the representation function of an additive basis for the integers

Number Theory 2016-12-30 v2 Combinatorics

Abstract

Let A be a set of integers. For every integer n, let r_{A,h}(n) denote the number of representations of n in the form n = a_1 + a_2 + ... + a_h, where a_1, a_2,...,a_h are in A and a_1 \leq a_2 \leq ... \leq a_h. The function r_{A,h}: Z \to N_0 \cup \infty is the representation function of order h for A. The set A is called an asymptotic basis of order h if r_{A,h}^{-1}(0) is finite, that is, if every integer with at most a finite number of exceptions can be represented as the sum of exactly h not necessarily distinct elements of A. It is proved that every function is a representation function, that is, if f: Z \to N_0 \cup \infty is any function such that f^{-1}(0) is finite, then there exists a set A of integers such that f(n) = r_{A,h}(n) for all n in Z. Moreover, the set A can be arbitrarily sparse in the sense that, if \phi(x) \to \infty, then there exists a set A with f(n) = r_{A,h}(n) such that card{a in A : |a| \leq x} < \phi(x) for all sufficiently large x.

Keywords

Cite

@article{arxiv.math/0302091,
  title  = {Every function is the representation function of an additive basis for the integers},
  author = {Melvyn B. Nathanson},
  journal= {arXiv preprint arXiv:math/0302091},
  year   = {2016}
}

Comments

15 pages. LaTex file. Corrected and revised manuscript