The Laplace Method for Energy Eigenvalue Problems in Quantum Mechanics

Canfield, J.; Galler, A.; Freericks, J. K.

doi:10.3390/quantum5020024

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The Laplace Method for Energy Eigenvalue Problems in Quantum Mechanics

Canfield, J., Galler, A., & Freericks, J. K. (2023). The Laplace Method for Energy Eigenvalue Problems in Quantum Mechanics. Quantum Reports, 5(2), 370-397. doi:10.3390/quantum5020024.

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Item Permalink: https://hdl.handle.net/21.11116/0000-000B-347B-1 Version Permalink: https://hdl.handle.net/21.11116/0000-000D-0B4F-0

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https://arxiv.org/abs/2208.07433 (Preprint) Open Access status unknown

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Creators:
Canfield, J.¹, Author
Galler, A.², Author
Freericks, J. K.¹, Author

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1Department of Physics, Georgetown University, ou_persistent22
2Theory Group, Theory Department, Max Planck Institute for the Structure and Dynamics of Matter, Max Planck Society, ou_2266715

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Free keywords: nonrelativistic quantum mechanics; exactly solvable problems; Laplace method

Abstract: Quantum mechanics has about a dozen exactly solvable potentials. Normally, the time-independent Schrödinger equation for them is solved by using a generalized series solution for the bound states (using the Fröbenius method) and then an analytic continuation for the continuum states (if present). In this work, we present an alternative way to solve these problems, based on the Laplace method. This technique uses a similar procedure for the bound states and for the continuum states. It was originally used by Schrödinger when he solved the wave functions of hydrogen. Dirac advocated using this method too. We discuss why it is a powerful approach to solve all problems whose wave functions are represented in terms of confluent hypergeometric functions, especially for the continuum solutions, which can be determined by an easy-to-program contour integral.

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Language(s): eng - English

Dates: Modified: 2023-02-25Submitted: 2023-02-05Accepted: 2023-03-31Published Online: 2023-04-20

Publication Status: Published online

Pages: 28

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Rev. Type: Peer

Identifiers: arXiv: 2208.07433
DOI: 10.3390/quantum5020024

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Project name : We acknowledge useful discussions with Wesley Mathews Jr.

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Title: Quantum Reports

Abbreviation : Quantum Rep.

Source Genre: Journal

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Publ. Info: Basel : MDPI

Pages: - Volume / Issue: 5 (2) Sequence Number: - Start / End Page: 370 - 397 Identifier: ISSN: 2624-960X
CoNE: https://pure.mpg.de/cone/journals/resource/2624-960X