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Solution of Certain Problems in Quantum Mechanics
(eBook)
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Language
English
ISBN
9780486829616
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Citations
APA Citation, 7th Edition (style guide)
A. Bolotin., A. Bolotin|AUTHOR., A. Pozamantir|AUTHOR., & A. Raudeliunas|AUTHOR. (2018). Solution of Certain Problems in Quantum Mechanics . Dover Publications.
Chicago / Turabian - Author Date Citation, 17th Edition (style guide)A. Bolotin et al.. 2018. Solution of Certain Problems in Quantum Mechanics. Dover Publications.
Chicago / Turabian - Humanities (Notes and Bibliography) Citation, 17th Edition (style guide)A. Bolotin et al.. Solution of Certain Problems in Quantum Mechanics Dover Publications, 2018.
MLA Citation, 9th Edition (style guide)A. Bolotin, A. Bolotin|AUTHOR, A. Pozamantir|AUTHOR, and A. Raudeliunas|AUTHOR. Solution of Certain Problems in Quantum Mechanics Dover Publications, 2018.
Note! Citations contain only title, author, edition, publisher, and year published. Citations should be used as a guideline and should be double checked for accuracy. Citation formats are based on standards as of August 2021.
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Grouping Information
| Grouped Work ID | 241edb42-7aee-708e-9535-926cd44ff3a2-eng |
|---|---|
| Full title | solution of certain problems in quantum mechanics |
| Author | bolotin a |
| Grouping Category | book |
| Last Update | 2022-12-03 18:03:28PM |
| Last Indexed | 2024-04-20 02:50:11AM |
Book Cover Information
| Image Source | coce_google_books |
|---|---|
| First Loaded | Jun 19, 2022 |
| Last Used | Nov 6, 2023 |
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[synopsis] => Intended for advanced undergraduates and graduate students in mathematics, physics, and chemistry, this work teaches problem-solving using the theory of special functions. The concise treatment presents the theory methodically and in detail to a wide variety of problems in atomic and molecular physics. The overall applicability of this method and its extension to solving these problems are discussed with attention to detail seldom found in textbooks of this level. Starting with a brief introduction to the hypergeometric equations and their properties, a step-by-step method consisting of six distinct parts illustrates how to address typical problems in quantum physics in a simple and uniform fashion. This technique can also be applied to the solution of other problems, for which the Schrödinger equation can be reduced by some means to an equation of the hypergeometric type. Topics include the discrete spectrum eigenfunctions, linear harmonic oscillators, Kratzer molecular potential, and the rotational correction to the Morse formula. The text concludes with an Appendix that presents an original Fourier transform-based method for converting multicenter integrals to a single center.
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