Non-perturbative Description of Quantum Systems
This book introduces systematically the operator method for the solution of the Schrödinger equation. This method permits to describe the states of quantum systems in the entire range of parameters of Hamiltonian with a predefined accuracy. The operator method is unique compared with other non-pertu...
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2016
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oai:scholar.dlu.edu.vn:DLU123456789-597382023-11-11T06:50:06Z Non-perturbative Description of Quantum Systems Feranchuk, I Ivanov, A Le, V.-H Ulyanenkov, A Quantum Physics Mathematics Quantum theory Schrödinger equation This book introduces systematically the operator method for the solution of the Schrödinger equation. This method permits to describe the states of quantum systems in the entire range of parameters of Hamiltonian with a predefined accuracy. The operator method is unique compared with other non-perturbative methods due to its ability to deliver in zeroth approximation the uniformly suitable estimate for both ground and excited states of quantum system. The method has been generalized for the application to quantum statistics and quantum field theory. In this book, the numerous applications of operator method for various physical systems are demonstrated. Simple models are used to illustrate the basic principles of the method which are further used for the solution of complex problems of quantum theory for many-particle systems. The results obtained are supplemented by numerical calculations, presented as tables and figures. 2016-03-02T07:05:22Z 2016-03-02T07:05:22Z 2015 Book 978-3-319-13006-4 978-3-319-13005-7 https://scholar.dlu.edu.vn/thuvienso/handle/DLU123456789/59738 en application/pdf Springer |
| institution |
Thư viện Trường Đại học Đà Lạt |
| collection |
Thư viện số |
| language |
English |
| topic |
Quantum Physics Mathematics Quantum theory Schrödinger equation |
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Quantum Physics Mathematics Quantum theory Schrödinger equation Feranchuk, I Ivanov, A Le, V.-H Ulyanenkov, A Non-perturbative Description of Quantum Systems |
| description |
This book introduces systematically the operator method for the solution of the Schrödinger equation. This method permits to describe the states of quantum systems in the entire range of parameters of Hamiltonian with a predefined accuracy. The operator method is unique compared with other non-perturbative methods due to its ability to deliver in zeroth approximation the uniformly suitable estimate for both ground and excited states of quantum system. The method has been generalized for the application to quantum statistics and quantum field theory. In this book, the numerous applications of operator method for various physical systems are demonstrated. Simple models are used to illustrate the basic principles of the method which are further used for the solution of complex problems of quantum theory for many-particle systems. The results obtained are supplemented by numerical calculations, presented as tables and figures. |
| format |
Book |
| author |
Feranchuk, I Ivanov, A Le, V.-H Ulyanenkov, A |
| author_facet |
Feranchuk, I Ivanov, A Le, V.-H Ulyanenkov, A |
| author_sort |
Feranchuk, I |
| title |
Non-perturbative Description of Quantum Systems |
| title_short |
Non-perturbative Description of Quantum Systems |
| title_full |
Non-perturbative Description of Quantum Systems |
| title_fullStr |
Non-perturbative Description of Quantum Systems |
| title_full_unstemmed |
Non-perturbative Description of Quantum Systems |
| title_sort |
non-perturbative description of quantum systems |
| publisher |
Springer |
| publishDate |
2016 |
| url |
https://scholar.dlu.edu.vn/thuvienso/handle/DLU123456789/59738 |
| _version_ |
1819795458953838592 |