Absolute Lower Bound on the Bounce Action
Abstract
The decay rate of a false vacuum is determined by the minimal action solution of the tunnelling field: bounce. In this Letter, we focus on models with scalar fields which have a canonical kinetic term in dimensional Euclidean space, and derive an absolute lower bound on the bounce action. In the case of four-dimensional space, we show the bounce action is generically larger than , where with the false vacuum being at and . We derive this bound on the bounce action \textit{without solving the equation of motion explicitly}. Our bound is derived by a quite simple discussion, and it provides useful information even if it is difficult to obtain the explicit form of the bounce solution. Our bound offers a sufficient condition for the stability of a false vacuum, and it is useful as a quick check on the vacuum stability for given models. Our bound can be applied to a broad class of scalar potential with any number of scalar fields. We also discuss a necessary condition for the bounce action taking a value close to this lower bound.
Keywords
Cite
@article{arxiv.1707.01099,
title = {Absolute Lower Bound on the Bounce Action},
author = {Ryosuke Sato and Masahiro Takimoto},
journal= {arXiv preprint arXiv:1707.01099},
year = {2018}
}
Comments
7 pages, 4 figure; v2 version published, discussions and references are added