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Hyperspherical Harmonics Expansion T...
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Das, Tapan Kumar.
Hyperspherical Harmonics Expansion Techniques = Application to Problems in Physics /
Record Type:
Language materials, printed : Monograph/item
Title/Author:
Hyperspherical Harmonics Expansion Techniques/ by Tapan Kumar Das.
Reminder of title:
Application to Problems in Physics /
Author:
Das, Tapan Kumar.
Description:
XI, 159 p. 6 illus.online resource. :
Contained By:
Springer Nature eBook
Subject:
Physics. -
Online resource:
https://doi.org/10.1007/978-81-322-2361-0
ISBN:
9788132223610
Hyperspherical Harmonics Expansion Techniques = Application to Problems in Physics /
Das, Tapan Kumar.
Hyperspherical Harmonics Expansion Techniques
Application to Problems in Physics /[electronic resource] :by Tapan Kumar Das. - 1st ed. 2016. - XI, 159 p. 6 illus.online resource. - Theoretical and Mathematical Physics,1864-5879. - Theoretical and Mathematical Physics,.
Introduction -- Systems of One or More Particles -- Three-body System -- General Many-body Systems.- The Trinucleon System -- Application to Coulomb Systems -- Potential Harmonics -- Application to Bose-Einstein Condensates -- Integro-differential Equation -- Computational Techniques.
The book provides a generalized theoretical technique for solving the fewbody Schrödinger equation. Straight forward approaches to solve it in terms of position vectors of constituent particles and using standard mathematical techniques become too cumbersome and inconvenient when the system contains more than two particles. The introduction of Jacobi vectors, hyperspherical variables and hyperspherical harmonics as an expansion basis is an elegant way to tackle systematically the problem of an increasing number of interacting particles. Analytic expressions for hyperspherical harmonics, appropriate symmetrisation of the wave function under exchange of identical particles and calculation of matrix elements of the interaction have been presented. Applications of this technique to various problems of physics have been discussed. In spite of straight forward generalization of the mathematical tools for increasing number of particles, the method becomes computationally difficult for more than a few particles. Hence various approximation methods have also been discussed. Chapters on the potential harmonics and its application to Bose-Einstein condensates (BEC) have been included to tackle dilute system of a large number of particles. A chapter on special numerical algorithms has also been provided. This monograph is a reference material for theoretical research in the few-body problems for research workers starting from advanced graduate level students to senior scientists.
ISBN: 9788132223610
Standard No.: 10.1007/978-81-322-2361-0doiSubjects--Topical Terms:
564049
Physics.
LC Class. No.: QC1-999
Dewey Class. No.: 530.1
Hyperspherical Harmonics Expansion Techniques = Application to Problems in Physics /
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Introduction -- Systems of One or More Particles -- Three-body System -- General Many-body Systems.- The Trinucleon System -- Application to Coulomb Systems -- Potential Harmonics -- Application to Bose-Einstein Condensates -- Integro-differential Equation -- Computational Techniques.
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The book provides a generalized theoretical technique for solving the fewbody Schrödinger equation. Straight forward approaches to solve it in terms of position vectors of constituent particles and using standard mathematical techniques become too cumbersome and inconvenient when the system contains more than two particles. The introduction of Jacobi vectors, hyperspherical variables and hyperspherical harmonics as an expansion basis is an elegant way to tackle systematically the problem of an increasing number of interacting particles. Analytic expressions for hyperspherical harmonics, appropriate symmetrisation of the wave function under exchange of identical particles and calculation of matrix elements of the interaction have been presented. Applications of this technique to various problems of physics have been discussed. In spite of straight forward generalization of the mathematical tools for increasing number of particles, the method becomes computationally difficult for more than a few particles. Hence various approximation methods have also been discussed. Chapters on the potential harmonics and its application to Bose-Einstein condensates (BEC) have been included to tackle dilute system of a large number of particles. A chapter on special numerical algorithms has also been provided. This monograph is a reference material for theoretical research in the few-body problems for research workers starting from advanced graduate level students to senior scientists.
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