Converting a series in \lambda to a series in \lambda^{-1}
Abstract
We introduce a transformation for converting a series in a parameter, \lambda, to a series in the inverse of the parameter \lambda^{-1}. By applying the transform on simple examples, it becomes apparent that there exist relations between convergent and divergent series, and also between large- and small-coupling expansions. The method is also applied to the divergent series expansion of Euler-Heisenberg-Schwinger result for the one-loop effective action for constant background magnetic (or electric) field. The transform may help us gain some insight about the nature of both divergent (Borel or non-Borel summable series) and convergent series and their relationship, and how both could be used for analytical and numerical calculations.
Cite
@article{arxiv.hep-th/0305047,
title = {Converting a series in \lambda to a series in \lambda^{-1}},
author = {Andrew A. Rawlinson},
journal= {arXiv preprint arXiv:hep-th/0305047},
year = {2008}
}
Comments
7 pages, Latex, 3 figures; Typos corrected. To appear in Journal of Physics A: Math and Gen