Theorem (1+1.9) on the Goldbach Conjecture

Abstract

For 1 ≤ a ≤ 2, we say Proposition (1+a) holds if every sufficiently large even integer N can be written as N = p + rq, r ≤ qa-1, where r is either 1 or prime, and p,q are primes. Thus Proposition (1+1) is essentially the binary Goldbach Conjecture, and Proposition (1+2) is Chen's theorem. We prove unconditionally that Proposition (1+1.9) is true. Assuming the Elliott--Halberstam Conjecture, the exponent 1.9 can be improved to 1.4. Analogously, Proposition (1-a) is formulated for the Twin Prime Conjecture. Unconditionally, we prove Proposition (1-1.75), and under the Elliott--Halberstam Conjecture, Proposition (1-1.4). For six decades, a substantial theoretical divide has persisted between Propositions (1+2) and (1+1), and likewise between Propositions (1-2) and (1-1). By constructing new weighted sieves and adopting new analytic tools, this paper establishes a connecting pathway between them and achieves breakthroughs in this line of research.