Second Hardy–Littlewood conjecture

In number theory, the second Hardy–Littlewood conjecture concerns the number of primes in intervals. Along with the first Hardy–Littlewood conjecture, the second Hardy–Littlewood conjecture was proposed by G. H. Hardy and John Edensor Littlewood in 1923.

Statement
The conjecture states that

$$\pi(x+y) \leq \pi(x) + \pi(y)$$

for integers $x, y &geq; 2$, where $&pi;(z)$ denotes the prime-counting function, giving the number of prime numbers up to and including $z$.

Connection to the first Hardy–Littlewood conjecture
The statement of the second Hardy–Littlewood conjecture is equivalent to the statement that the number of primes from $x + 1$ to $x + y$ is always less than or equal to the number of primes from 1 to $y$. This was proved to be inconsistent with the first Hardy–Littlewood conjecture on prime $k$-tuples, and the first violation is expected to likely occur for very large values of $x$. For example, an admissible k-tuple (or prime constellation) of 447 primes can be found in an interval of $y = 3159$ integers, while $&pi;(3159) = 446$. If the first Hardy–Littlewood conjecture holds, then the first such $k$-tuple is expected for $x$ greater than $1.5 × 10^{174}$ but less than $2.2 × 10^{1198}$.