On the ternary Goldbach problem with primes \(p_i\) such that \(p_i+2\) are almost-primes (Q5932658)

The author proves that every sufficiently large integer \(N\), for which \(N\equiv 3 \pmod 6\), can be represented as the sum of three primes \(p_1\), \(p_2\), \(p_3\), such that \(p_1+2\) and \(p_2+2\) have no more than \(5\) and \(p_3+2\) has no more than \(8\) prime factors, counted according to multiplicity.