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The Power of Perturbation Theory

arXiv:1702.04148 · doi:10.1007/JHEP05(2017)056

Abstract

We study quantum mechanical systems with a discrete spectrum. We show that the asymptotic series associated to certain paths of steepest-descent (Lefschetz thimbles) are Borel resummable to the full result. Using a geometrical approach based on the Picard-Lefschetz theory we characterize the conditions under which perturbative expansions lead to exact results. Even when such conditions are not met, we explain how to define a different perturbative expansion that reproduces the full answer without the need of transseries, i.e. non-perturbative effects, such as real (or complex) instantons. Applications to several quantum mechanical systems are presented.

v1: 42 pages, 8 figures; v2: 43 pages, 9 figures, minor improvements and references added, matches JHEP published version; v3: minor corrections and references added