Ramanujan prime


In mathematics, a Ramanujan prime is a prime number that satisfies a result proven by Srinivasa Ramanujan relating to the prime-counting function.

Origins and definition

In 1919, Ramanujan published a new proof of Bertrand's postulate which, as he notes, was first proved by Chebyshev. At the end of the two-page published paper, Ramanujan derived a generalized result, and that is:
where is the prime-counting function, equal to the number of primes less than or equal to x.
The converse of this result is the definition of Ramanujan primes:
The first five Ramanujan primes are thus 2, 11, 17, 29, and 41.
Note that the integer Rn is necessarily a prime number: and, hence, must increase by obtaining another prime at x = Rn. Since can increase by at most 1,

Bounds and an asymptotic formula

For all, the bounds
hold. If, then also
where pn is the nth prime number.
As n tends to infinity, Rn is asymptotic to the 2nth prime, i.e.,
All these results were proved by Sondow, except for the upper bound Rn < p3n which was conjectured by him and proved by Laishram. The bound was improved by Sondow, Nicholson, and Noe to
which is the optimal form of Rnc·p3n since it is an equality for n = 5.