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Article

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Title

Separable quantizations of Stäckel systems

Authors

Year of publication

2016

Published in

Annals of Physics

Journal year: 2016 | Journal volume: vol. 371

Article type

scientific article

Publication language

english

Keywords
EN
  • hamiltonian system
  • Hamilton–Jacobi equation
  • Schrödinger equation
  • separability
  • quantization
  • pre-Robertson condition
Abstract

EN In this article we prove that many Hamiltonian systems that cannot be separably quantized in the classical approach of Robertson and Eisenhart can be separably quantized if we extend the class of admissible quantizations through a suitable choice of Riemann space adapted to the Poisson geometry of the system. Actually, in this article we prove that for every quadratic in momenta Stäckel system (defined on 2n dimensional Poisson manifold) for which Stäckel matrix consists of monomials in position coordinates there exist infinitely many quantizations – parametrized by n arbitrary functions – that turn this system into a quantum separable Stäckel system.

Pages (from - to)

460 - 477

DOI

10.1016/j.aop.2016.06.007

URL

https://www.sciencedirect.com/science/article/pii/S0003491616300835?via%3Dihub

Ministry points / journal

40

Impact Factor

2,465

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