## Are there any interesting or lesser known proofs related to Bertrand’s Postulate

There are 3 standard proofs of Bertrand's Postulate:

(1) Chebyshev's original proof

(2) Ramanujan's simplification of Chebyshev's proof

(3) Erdos's proof

I recently learned about the very simple proof that if the Goldbach conjecture is true, then Bertrand's postulate follows (see here).

Does anyone know of any other proofs? There are recent proofs that extend Bertrand's postulate to show that there is always a prime in $2n$/$3n$ and $3n$/$4n$.

I am wondering if there aren't other lesser known proofs that take a different approach to establish the existence of a prime between $n$ and $2n$.

Thanks,

-Larry

-
I don't know about different, but Joe Roberts has a text you might like which has Finsler's refinement that gives estimates on pi(2n) -pi(n). It is a calligraphed number theory text. Gerhard "Ask Me About System Design" Paseman, 2012.08.01 – Gerhard Paseman Aug 1 at 23:15
Find a version of the prime number theorem that gives explicit lower and upper bounds... – Qiaochu Yuan Aug 1 at 23:24
The proof for $2n/3n$ is in this paper by el Bacharaoui: m-hikari.com/ijcms-password/… It is an extension of Erdos' proof. – Igor Rivin Aug 2 at 0:34

Bertrand's Postulate follows as a direct consequence of the following theorem of J.J. Sylvester:

Theorem (Sylvester, 1892): Let $k$ be a positive integer. Then at least one of any $k$ consecutive integers greater than $k$ is divisible by a prime greater than $k$.

(For comparison: Chebyshev's analytic proof dates to 1850; Erdos' elementary proof dates to 1932.)

See Theorem 6 (p. 6) in http://www.math.sc.edu/~filaseta/papers/schurpaper.pdf, from which I quote:

"The theorem implies immediately that for any positive integer $k$, one of $k+1, k+2, \ldots, 2k$ is a prime (since one of these integers must be divisible by a prime $\geq k+1).$"

Unfortunately, my internet search has not led me to the original paper by Sylvester.

-
J. J. Sylvester. On arithmetical series. Messenger Math. 21 (1892), pp. 1-19, 87-120, 192. (See p. 4) – Charles Aug 7 at 18:02
Thanks, though I should have been more clear: I can't find a link to that particular paper anywhere online. – Benjamin Dickman Aug 12 at 23:50
Here's an online link to the Sylvester paper: gdz.sub.uni-goettingen.de/dms/load/img/… – Larry Freeman Sep 6 at 1:17

A stronger version is proved by Jonathan Sondow in this arxiv preprint (which looks like a monthly paper).

-
 Could you fix the link to go to the abstract rather than directly to the PDF? – Harry Altman Aug 7 at 8:03 OK, here you go. – Igor Rivin Aug 7 at 13:26 Okay, thank you! – Harry Altman Aug 8 at 13:33

The proofs for $(2n,3n)$ and $(3n,4n)$ are elementary and very pleasing (based on a quick look.) It is known that there is always a prime between $k$ and $\frac{6k}{5}\$ for $k \gt 24.$ The proof is more involved but do not use anything analytic. Putting $k=2n$ etc gives a prime in $(4n,\frac{24n}{5})$ (except $n=1,2,6$) and hence in $(4n,5n)$ except for $n=1,2$ and one in $(5n,6n)$ except for $n=1$.

-

Nice question! For a point of view from the perspective of Goldbach's conjecture, perhaps one can consider also Theorem 3.7 of "The Hardy-Littlewood Method", 2nd edition, by R.C. Vaughan.

-
 This should work by counting prime pairs that sum to $m$ for each even $m$ between $n/2$ and $n$. If there are no primes between $n/2$ and $n$, the sum on the left in the above theorem should be too large. – unknown (google) Aug 8 at 5:44

I found an interesting proof today that demonstrates a stronger form of Bertrand's Postulate. I hadn't seen it before:

Abstract. In this paper we give a stronger form of Bertrand's postulate and use it to prove that every positive integer, except 1, 2, 4, 6, and 9, can be written as the sum of distinct odd primes.

http://www.ams.org/journals/proc/1972-033-02/S0002-9939-1972-0292746-6/S0002-9939-1972-0292746-6.pdf

-

Re-extending Chebyshev’s theorem about Bertrand’s conjecture: