Generalized additive bases, Konig's lemma, and the Erdos-Turan conjecture

Abstract

Let A be a set of nonnegative integers. For every nonnegative integer n and positive integer h, let rA(n,h) denote the number of representations of n in the form n = a1 + a2 + ... + ah, where a1, a2,..., ah are elements of A and a1 ≤ a2 ≤ ... ≤ ah. The infinite set A is called a basis of order h if rA(n,h) ≥ 1 for every nonnegative integer n. Erdos and Turan conjectured that limsupn∞ rA(n,2) = ∞ for every basis A of order 2. This paper introduces a new class of additive bases and a general additive problem, a special case of which is the Erdos-Turan conjecture. Konig's lemma on the existence of infinite paths in certain graphs is used to prove that this general problem is equivalent to a related problem about finite sets of nonnegative integers.

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