On the values of representation functions II
Abstract
For a set A of nonnegative integers, let R2(A,n) and R3(A,n) denote the number of solutions to n=a+a' with a,a'∈ A, a<a' and a≤ a', respectively. In this paper, we prove that, if A⊂eq N and N is a positive integer such that R2(A,n)=R2(N A,n) for all n≥2N-1, then for any θ with 0<θ<22-342 2-93, the set of integers n with R2(A,n)=n8+O(n1-θ) has density one. The similar result holds for R3(A,n). These improve the results of the first author.
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