Bertrand's postulate

Template:Prime gap fact

Statement

Let ${\displaystyle n}$ be a natural number greater than ${\displaystyle 1}$. Then, there exists a prime number ${\displaystyle p}$ such that ${\displaystyle n<p<2n}$.

In other words, the prime gap, i.e., the gap between a prime ${\displaystyle p}$ and the next prime, is strictly smaller than ${\displaystyle p}$.

Relation with other facts and conjectures

Upper bounds on the limit superior of prime gap

• Cramér's prime gap conjecture states that the prime gap (i.e., the gap between a prime and the next prime) is ${\displaystyle O((\log p)^{2})}$.
• The prime-between-squares conjecture states that there exists a prime between the squares of any two consecutive natural numbers.
• The Riemann hypothesis implies the large prime gap conjecture, which states that the prime gap is ${\displaystyle O({\sqrt {p}}\log(p))}$.

Lower bounds on the limit superior of prime gaps

• Rankin's bound states that there exist arbitrarily large primes ${\displaystyle p}$ for which the prime gap is:

${\displaystyle \Omega (\log p{\frac {\log \log p\log \log \log \log p}{(\log \log \log p)^{2}}}}$.