On limit points of the sequence of normalized prime gaps

Abstract

Let pn denote the nth smallest prime number, and let L denote the set of limit points of the sequence \(pn+1 - pn)/ pn\n = 1∞ of normalized differences between consecutive primes. We show that for k = 9 and for any sequence of k nonnegative real numbers β1 β2 ... βk, at least one of the numbers βj - βi (1 i < j k) belongs to L. It follows at least 12.5% of all nonnegative real numbers belong to L.