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 PicardLefschetz 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
We use the AdS/CFT correspondence to study the resummation of a perturbative genus expansion appeari...
A general quantum mechanical or quantum field theoretical system in the path integral formulation ha...
Abstract: Resurgence theory implies that the non-perturbative (NP) and perturbative (P) data in a QF...
We study quantum mechanical systems with a discrete spectrum. We show that the asymptotic series ass...
It is well known that quantum-mechanical perturbation theory often give rise to divergent series tha...
The improvement of resummation algorithms for divergent perturbative expansions in quantum field the...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
Resurgence theory implies that the non-perturbative (NP) and perturbative (P) data in a QFT are quan...
Certain quantum mechanical potentials give rise to a vanishing perturbation series for at least one ...
AbstractCertain quantum mechanical potentials give rise to a vanishing perturbation series for at le...
A method for the resummation of a nonalternating divergent perturbation series is described. The pro...
AbstractWe present a method for extracting tunnelling amplitudes from perturbation expansions which ...
We study the anharmonic double well in quantum mechanics using exact Wentzel-Kramers-Brillouin (WKB)...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Perturbative expansions in many physical systems yield "only" asymptotic series which are not even B...
We use the AdS/CFT correspondence to study the resummation of a perturbative genus expansion appeari...
A general quantum mechanical or quantum field theoretical system in the path integral formulation ha...
Abstract: Resurgence theory implies that the non-perturbative (NP) and perturbative (P) data in a QF...
We study quantum mechanical systems with a discrete spectrum. We show that the asymptotic series ass...
It is well known that quantum-mechanical perturbation theory often give rise to divergent series tha...
The improvement of resummation algorithms for divergent perturbative expansions in quantum field the...
AbstractThis is the first in a series of articles on singular perturbation series in quantum mechani...
Resurgence theory implies that the non-perturbative (NP) and perturbative (P) data in a QFT are quan...
Certain quantum mechanical potentials give rise to a vanishing perturbation series for at least one ...
AbstractCertain quantum mechanical potentials give rise to a vanishing perturbation series for at le...
A method for the resummation of a nonalternating divergent perturbation series is described. The pro...
AbstractWe present a method for extracting tunnelling amplitudes from perturbation expansions which ...
We study the anharmonic double well in quantum mechanics using exact Wentzel-Kramers-Brillouin (WKB)...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Perturbative expansions in many physical systems yield "only" asymptotic series which are not even B...
We use the AdS/CFT correspondence to study the resummation of a perturbative genus expansion appeari...
A general quantum mechanical or quantum field theoretical system in the path integral formulation ha...
Abstract: Resurgence theory implies that the non-perturbative (NP) and perturbative (P) data in a QF...