In number theory, Cramér's conjecture, formulated by the Swedish mathematician Harald Cramér in 1936, is an estimate for the size of gaps between consecutive prime numbers: intuitively, that gaps between consecutive primes are always small, and the conjecture quantifies asymptotically just how small they must be. It states that
where pn denotes the nth prime number, O is big O notation, and "log" is the natural logarithm. While this is the statement explicitly conjectured by Cramér, his heuristic actually supports the stronger statement
and sometimes this formulation is called Cramér's conjecture. However, this stronger version is not supported by more accurate heuristic models, which nevertheless support the first version of Cramér's conjecture. Neither form has yet been proven or disproven.
Conditional proven results on prime gapsEdit
In the other direction, E. Westzynthius proved in 1931 that prime gaps grow more than logarithmically. That is,
Cramér's conjecture is based on a probabilistic model—essentially a heuristic—in which the probability that a number of size x is prime is 1/log x. This is known as the Cramér random model or Cramér model of the primes.
In the Cramér random model,
with probability one. However, as pointed out by Andrew Granville, Maier's theorem shows that the Cramér random model does not adequately describe the distribution of primes on short intervals, and a refinement of Cramér's model taking into account divisibility by small primes suggests that (OEIS: A125313), where is the Euler–Mascheroni constant. János Pintz has suggested that the limit sup may be infinite, and similarly Leonard Adleman and Kevin McCurley write
- As a result of the work of H. Maier on gaps between consecutive primes, the exact formulation of Cramér's conjecture has been called into question [...] It is still probably true that for every constant , there is a constant such that there is a prime between and . 
Related conjectures and heuristicsEdit
In the paper  J.H. Cadwell has proposed the formula for the maximal gaps: which is formally identical to the Shanks conjecture but suggests a lower-order term.
which for large is also asymptotically equivalent to the Cramér and Shanks conjectures: .
He writes, “For the largest known maximal gaps, has remained near 1.13.” However, is still less than 1.
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