On the Higher Loop Euler-Heisenberg Trans-Series Structure
Abstract
We show that the one-loop Euler-Heisenberg QED effective Lagrangian in a constant background field acquires a very different non-perturbative trans-series structure at two-loop and higher-loop order in the fine structure constant. Beyond one-loop, virtual particles interact, causing fluctuations about the instantons, whereby the simple poles of the one-loop Borel transform become branch points. We illustrate this in detail at two-loop order using Ritus's seminal result for the renormalized two-loop effective Lagrangian as an exact double-integral representation, and propose a possible new approach to computations at higher loop order. Our methods yield remarkably accurate extrapolations from weak-field to strong-field, and from magnetic to electric background field, at both one-loop and two-loop order, based on surprisingly little perturbative input.
Keywords
Cite
@article{arxiv.2101.10409,
title = {On the Higher Loop Euler-Heisenberg Trans-Series Structure},
author = {Gerald V. Dunne and Zachary Harris},
journal= {arXiv preprint arXiv:2101.10409},
year = {2021}
}
Comments
22 pages, 19 figures