On Sárközy-Sós Theorem related to representation functions

Abstract

Let N0 be the set of all nonnegative integers. For a nonempty set A⊂eq N0 and integers n,h 2, let rh(A,n) be the number of representations of n as a1+·s+ah, where a1 ·s ah and ai∈ A for i=1,·s,h. In 2016, Chen and Tang showed that, for any given distinct positive integers u1,·s,uk and positive rational numbers α1,·s,αk with α1+·s+αk=1, there are infinitely many sets A⊂eq N0 such that rh(A,n) 1 for all nonnegative integers n and the set of n with rh(A,n)=ui has density αi for all integer i=1,·s,k. In this paper, we consider the irrational numbers αi as well. As a main result, we prove that, for any nonnegative numbers α0,·s,αm with α0+·s+αm=1, there are infinitely many sets A⊂eq N0 such that the set of n with r2(A,n)=i has density αi for all integer i=0,·s,m. Other related results are also contained.

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