The convergence of an alternating series of Erdos, assuming the Hardy--Littlewood prime tuples conjecture

Abstract

It is an open question of Erdos as to whether the alternating series Σn=1∞ (-1)n npn is (conditionally) convergent, where pn denotes the nth prime. By using a random sifted model of the primes recently introduced by Banks, Ford, and the author, as well as variants of a well known calculation of Gallagher, we show that the answer to this question is affirmative assuming a suitably strong version of the Hardy--Littlewood prime tuples conjecture.