It is generally believed that the Second Hardy-Littlewood Conjecture is false. But it has not been proved (or disproved) yet. My question is,
What would be the consequences if Second Hardy-Littlewood Conjecture turns out to be true?
Obviously one consequence is that the First Hardy-Littlewood Conjecture (or the $k$-tuple Conjecture) would be false and hence all the results that would follow iff the $k$-tuple Conjecture would hold will be false. To be honest I don't know any such conjectures which holds iff the $k$-tuple Conjecture holds. So it will be great if someone provides some references regarding this issue.
Apart from this results or examples, if there are some conjectures which would follow iff the Second Hardy-Littlewood Conjecture is true, a reference of them would be nice.
Added:- Due to the comment below, I will briefly state the two conjectures. But I retain the links for a reference to some authentic source.
$k$-tuple Conjecture
If $b_1,b_2,\ldots,b_k$ is an admissible $k$-tuple of integers then there exists infinitely many integral values of $x$ such that $x+b_1,x+b_2,\ldots, x+b_k$ are all prime.
Here by the admissible $k$-tuple $b_1,b_2,\ldots,b_k$ we mean that for every prime $p$ there exists an integer $x$ such that all the integers $x+b_1,x+b_2,\ldots, x+b_k$ are incongruent modulo $p$.
Second Hardy-Littlewood Conjeture
$$\pi(x)+\pi(y)\ge \pi(x+y)\qquad \forall x,y\geq 2$$
