Product of difference sets of set of primes
Abstract
In a recent work key-11, A. Fish proved that if E1 and E2 are two subsets of Z of positive upper Banach density, then there exists k∈Z such that k·Z⊂(E1-E1)·(E2-E2). In this article we will show that a similar result is true for the set of primes P (which has density 0). We will prove that there exists k∈N such that k·N⊂(P-P)·(P-P), where P-P=\ p-q:p>q\,and\,p,q∈P\ .
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