Which Partial Sums of the Taylor Series for e are Convergents to e? (and a Link to the Primes 2, 5, 13, 37, 463), II

Abstract

This is an expanded version of our earlier paper. Let the nth partial sum of the Taylor series e = Σr=0∞ 1/r! be An/n!, and let pk/qk be the kth convergent of the simple continued fraction for e. Using a recent measure of irrationality for e, we prove weak versions of our conjecture that only two of the partial sums are convergents to e. A related result about the denominators qk and powers of factorials is proved. We also show a surprising connection between the An and the primes 2, 5, 13, 37, 463. In the Appendix, we give a conditional proof of the conjecture, assuming a second conjecture we make about the zeros of An and qk modulo powers of 2. Tables supporting this Zeros Conjecture are presented and we discuss a 2-adic reformulation of it.