Averages over the Gaussian Primes: Goldbach's Conjecture and Improving Estimates

Abstract

We prove versions of Goldbach conjectures for Gaussian primes in arbitrary sectors. Fix an interval ω ⊂ T. There is an integer Nω , so that every odd integer n with N(n)>Nω and dist( arg(n) , T ω ) > ( N(n)) -B, is a sum of three Gaussian primes n=p1+p2+p3, with arg(pj) ∈ ω , for j=1,2,3. A density version of the binary Goldbach conjecture in a sector is also proved.