On nonconvex constellations among primes I
Abstract
Extending our work on the k-tuple conjecture, we apply those methods to the Engelsma counterexamples (narrow constellations) of length J=459 and span |s|=3242. We track the evolution of these 58 counterexamples from inadmissible driving terms starting in the cycle of gaps G(11\#) up through their first appearance in G(113\#). We continue developing primorial coordinates for each admissible instance through a breadth-first exhaustive search through G(211\#), at which point we need to develop strategies for depth-first searches for an instance that would survive Eratosthenes sieve. Our calculations show that none of the (459,3242)-counterexamples occur before 9.7\,E73. For each of the 58 Engelsma (459,3242)-counterexamples we calculate its asymptotic relative population, among other constellations of length J=459, and we study how these counterexamples work. In this version (9 April) we have completed the calculations in Table 6 to include all of the terms in primorial expansion for the smallest initial generator and corrected a typographical error on page 6.
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