Asymptotic nonlocality
Abstract
We construct a theory of real scalar fields that interpolates between two different theories: a Lee-Wick theory with propagator poles, including Lee-Wick partners, and a nonlocal infinite-derivative theory with kinetic terms modified by an entire function of derivatives with only one propagator pole. Since the latter description arises when taking the limit, we refer to the theory as "asymptotically nonlocal." Introducing an auxiliary-field formulation of the theory allows one to recover either the higher-derivative form (for any ) or the Lee-Wick form of the Lagrangian, depending on which auxiliary fields are integrated out. The effective scale that regulates quadratic divergences in the large- theory is the would-be nonlocal scale, which can be hierarchically lower than the mass of the lightest Lee-Wick resonance. We comment on the possible utility of this construction in addressing the hierarchy problem.
Cite
@article{arxiv.2104.11195,
title = {Asymptotic nonlocality},
author = {Jens Boos and Christopher D. Carone},
journal= {arXiv preprint arXiv:2104.11195},
year = {2021}
}
Comments
21 pages LaTeX, 3 figures. Discussion added; $m_1$ now consistently refers to the lightest Lee--Wick mass, with Fig. 1 updated accordingly; v1: 20 pages LaTeX, 3 figures