2017
DOI: 10.1088/1751-8121/aa9e77
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Holomorphic anomaly and quantum mechanics

Abstract: We show that the all-orders WKB periods of one-dimensional quantum mechanical oscillators are governed by the refined holomorphic anomaly equations of topological string theory. We analyze in detail the double-well potential and the cubic and quartic oscillators, and we calculate the WKB expansion of their quantum free energies by using the direct integration of the anomaly equations. We reproduce in this way all known results about the quantum periods of these models, which we express in terms of modular form… Show more

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Cited by 51 publications
(122 citation statements)
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References 109 publications
(298 reference statements)
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“…In the gauge theory formalism, this "quantum Matone relation" generalizes the classical Matone relation [87] with the inclusion of gravitational couplings [88][89][90][91][92], and it also has a natural interpretation in all-orders WKB [27,60,63]. At the classical level, → 0, the relation (1.5) is a simple consequence of the associated classical Picard-Fuchs equation, which characterizes the energy dependence of the classical action variables (see section 3.1.1 below).…”
Section: Jhep05(2017)087mentioning
confidence: 95%
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“…In the gauge theory formalism, this "quantum Matone relation" generalizes the classical Matone relation [87] with the inclusion of gravitational couplings [88][89][90][91][92], and it also has a natural interpretation in all-orders WKB [27,60,63]. At the classical level, → 0, the relation (1.5) is a simple consequence of the associated classical Picard-Fuchs equation, which characterizes the energy dependence of the classical action variables (see section 3.1.1 below).…”
Section: Jhep05(2017)087mentioning
confidence: 95%
“…We stress that this manifestation of resurgence is completely constructive: given a certain number of terms of the expansion of u pert ( , N ), the expression (1.4) generates a similar number of terms in the fluctuations about the one-instanton sector, P inst ( , N ). Furthermore, these relations propagate throughout the entire trans-series, so that perturbation theory encodes the fluctuations about each nonperturbative sector [17][18][19][20][21][22][23][24][25]27].…”
Section: Jhep05(2017)087mentioning
confidence: 99%
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