Some results on a conjecture of de Polignac about numbers of the form p + 2k

Abstract

We have primarily obtained three results on numbers of the form p + 2k. Firstly, we have constructed many arithmetic progressions, each of which does not contain numbers of the form p + 2k, disproving a conjecture by Erdos as Chen did recently. Secondly, we have verified a conjecture by Chen that any arithmetic progression that do not contain numbers of the from p + 2k must have a common difference which is at least 11184810. Thirdly, we have improved the existing upper bound estimate for the density of numbers that can be expressed in the form p + 2k to 0.490341088858244.