Bounded length intervals containing two primes and an almost-prime

Abstract

Goldston, Pintz and Y ld r m have shown that if the primes have `level of distribution' θ for some θ>1/2 then there exists a constant C(θ), such that there are infinitely many integers n for which the interval [n,n+C(θ)] contains two primes. We show under the same assumption that for any integer k 1 there exists constants D(θ,k) and r(θ,k), such that there are infinitely many integers n for which the interval [n,n+D(θ,k)] contains two primes and k almost-primes, with all of the almost-primes having at most r(θ,k) prime factors. If θ can be taken as large as 1-ε, and provided that numbers with 2, 3, or 4 prime factors also have level of distribution 1-ε, we show that there are infinitely many integers n such that the interval [n,n+90] contains 2 primes and a number with at most 4 prime factors.