On Sums of Sets of Primes with Positive Relative Density
Abstract
In this paper we show that if A is a subset of the primes with positive relative density δ, then A+A must have positive upper density C1δ e-C2((1/δ))2/3((1/δ))1/3 in N. Our argument applies the techniques developed by Green and Green-Tao used to find arithmetic progressions in the primes, in combination with a result on sums of subsets of the multiplicative subgroup of the integers modulo M.
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