A Romanoff-type theorem for P2+aa: a 1

Abstract

Let Ω(n) denote the number of prime factors of n, counted with multiplicity, and put P2=m 1:Ω(m) 2. We prove that the sumset P2+aa: a 1 has positive lower density. The proof uses the Romanoff second moment method, in the spirit of Li and Pan's theorem on P2+2 P. The main new ingredient is the following average estimate for the singular factor \[ 1K(K-1) Σ1 a,b K\ b Πp aa-bb(1+κp) Cκ\] for some constant Cκ>0, which is valid for all K 2 and any fixed κ>0. This estimate controls the average arithmetic correlation among the shifts aa and allows the Romanoff argument to be carried out.

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