Models for gaps g=2p1

Abstract

We have shown previously that at each stage of Eratosthenes sieve there is a corresponding cycle of gaps G(p0\#). We can view these cycles of gaps as a discrete dynamic system, and from this system we can obtain exact models for the populations and relative populations of gaps g < 2p1 if we can get the initial conditions from G(p0\#). In this addendum we have shown that we can produce the model for g=2p1 from these initial conditions. This model requires one special iteration to track the count from G(p0\#) to G(p1\#), after which we can use the general model for these populations. As a specific example we exhibit the model for the gap g=82 using G(37\#) for initial conditions. We show further that in order to produce the models for g=2p1+2 and beyond from initial conditions in G(p0\#), we would have to track subpopulations of the driving terms until the general model applies, that is until g < 2pk+1. This work serves as an addendum to the existing references "Patterns among the Primes" and "Combinatorics of the gaps between primes". We do not duplicate that background here, beyond summarizing a few needed results.