On a continued fraction expansion for Euler's constant
Abstract
Recently, A. I. Aptekarev and his collaborators found a sequence of rational approximations to Euler's constant defined by a third-order homogeneous linear recurrence. In this paper, we give a new interpretation of Aptekarev's approximations in terms of Meijer -functions and hypergeometric-type series. This approach allows us to describe a very general construction giving linear forms in 1 and with rational coefficients. Using this construction we find new rational approximations to generated by a second-order inhomogeneous linear recurrence with polynomial coefficients. This leads to a continued fraction (though not a simple continued fraction) for Euler's constant. It seems to be the first non-trivial continued fraction expansion convergent to Euler's constant sub-exponentially, the elements of which can be expressed as a general pattern. It is interesting to note that the same homogeneous recurrence generates a continued fraction for the Euler-Gompertz constant found by Stieltjes in 1895.
Cite
@article{arxiv.1010.1420,
title = {On a continued fraction expansion for Euler's constant},
author = {Khodabakhsh Hessami Pilehrood and Tatiana Hessami Pilehrood},
journal= {arXiv preprint arXiv:1010.1420},
year = {2013}
}