Tags
Prizes
More
FAQ
Problem Lists
Definitions
Links
How to help
Go
Go
All
Random Solved
Random Open
OPEN
Let $d_n=p_{n+1}-p_n$, where $p_n$ is the $n$th prime. Let $r(x)$ be the smallest even integer $t$ such that $d_n=t$ has no solutions for $n\leq x$.
Is it true that $r(x)\to \infty$? Or even $r(x)/\log x \to \infty$?
#853
:
[Er85c]
number theory
,
primes
In
[Er85c]
Erdős omits the condition that $t$ be even, but this is clearly necessary.
Previous
Next
