An Improvement of Konstantoulas' Density Constant
Abstract
Let A⊂ N, and define its ordered representation function r(n)=\#\(a,b)∈ A× A:a+b=n\. The Erdos--Turan conjecture asserts that, if r(n) > 0 for all sufficiently large n, then r(n) is unbounded. Konstantoulas proved a density-theoretic version: if the upper density of E=N(A+A) is less than 1/10, then n∞ r(n)> 5. In this paper, we improve Konstantoulas' constant to 7/32. We also prove that D(E)< 1/2 implies n∞ r(n) > 3, and give a conditional criterion forcing n∞ r(n)>7.
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