Are there arbitrarily long arithmetic progressions in the sequence of twin primes?

Abstract

The main result of the paper is that assuming that the level θ of distribution of primes exceeds 1/2, then there exists a positive d≤ C(θ) such that there are arbitrarily long arithmetic progressions with the property that p'=p+d is the next prime for each element of the progression. If θ>0.971, then the above holds for some d≤ 16.