Revisiting Generalized Bertand's Postulate and Prime Gaps
Number Theory
2019-08-21 v3
Abstract
It is a well-known fact that for any natural number , there always exists a prime in . Our aim in this note is to generalize this result to . A lower as well as an upper bound on the number of primes in were conjectured by Mitra et al. [Arxiv 2009]. In 2016, Christian Axler provided a proof of the lower bound which is valid only when is greater than a very large threshold. In this paper, after almost a decade, we for the first time provide a direct proof of the lower bound that holds for all . Further, we show that the upper bound is a consequence of Firoozbakht's conjecture. Finally, we also prove a stronger version of the bounded gaps between primes.
Keywords
Cite
@article{arxiv.1710.09891,
title = {Revisiting Generalized Bertand's Postulate and Prime Gaps},
author = {Madhuparna Das and Goutam Paul},
journal= {arXiv preprint arXiv:1710.09891},
year = {2019}
}