Problem #234: For every $c\geq 0$ the density $f(c)$ of integers for...

For every $c\geq 0$ the density $f(c)$ of integers for which\[\frac{p_{n+1}-p_n}{\log n}< c\]exists and is a continuous function of $c$.

SOLVED

Problem Statement

For every $c\geq 0$ the density $f(c)$ of integers for which\[\frac{p_{n+1}-p_n}{\log n}< c\]exists and is a continuous function of $c$.

Categories: Number Theory Primes