The Goldbach conjecure is not yet proved. But, when an even number is represented as a sum of two primes, is there any knwon result about the difference of the two primes?
That is, if $2n$ is a sum of two primes, then can we choose primes $p$ and $q$ such that $2n = p+q$ and the differene $p-q$ is bounded by some formula about $n$?
It is clear that the difference is not bounded by a constant, because consecutive composite numbers can be made to be arbitrarily long.
The same method used to prove Chen's theorem produces the following:
Let $N$ be any even integer, then we have for sufficiently large $x$ that
\begin{aligned} \#\{p\le x:p+N&\text{ is a product of at most two primes}\} \\ &>0.67{x\over\log^2x}\prod_{\substack{p|N\\p>2}}{p-1\over p-2}\prod_{p>2}\left(1-{1\over(p-1)^2}\right). \end{aligned}
This is only a partial answer. Write $r_{0}(n):=\inf\{r\geq 0,(n-r,n+r)\in\mathbb{P}^{2}\}$, which is well defined whenever $n>1$ if you assume Goldbach's conjecture. Then if I'm not mistaken $r_{0}(n)$ is reached when you apply this algorithm recursively: $u_{0}(n):=0$ and $u_{k+1}(n):=u_{k}(n)+2^{1_{2\not\mid n}}.3^{1_{3\not\mid n}}\frac{(\Omega(n-u_{k}(n))+\Omega(n+u_{k}(n)-2))+\vert\Omega(n-u_{k}(n))-\Omega(n+u_{k}(n))\vert}{2}$ and the latter fraction equals $0$. If you can prove rigorously that this algorithm stops in $O((\log n)^2)$ steps, you're done.
