intervals between primes
- A question: if you take a the set of products of any two adjacent
primes beneath a value n, the lowest such product being 6, and you
subdivide it into two distinct subsets, one containing products that
are greater than half n and the other products that are less than half
n, then with ascending value of n, you must get a convergence upon a
particular ratio of the cardinality of the one subset to the other.
Surely it's not just 1 : 1, is it?
Any appropriate references will be gratefully received, assuming it
doesn't follow trivially from the PNT.
With thanks in advance.