Quantization of higher order regular lagrangians as first order singular lagrangians using path integral approach
Other Title(s)
تكميم دوال لاجرانج ذات الرتب العليا المنتظمة على أنها رتبة أولة شاذة باستخدام طريقة تكامل المسار
Dissertant
Thesis advisor
Rabi, Iqab Mahmud
al-Nawafilah, Khalid Isa
Comitee Members
al-Shar, Muhammad Abd al-Karim
al-Umari, Husayn Yusuf
al-Widyan, Hatim Salih
University
Mutah University
Faculty
Faculty of Science
Department
Department of physics
University Country
Jordan
Degree
Master
Degree Date
2007
English Abstract
In this thesis, systems with higher order regular Lagrangian are reduced into equivalent systems with first order singular Lagrangian using auxiliary degrees of freedom.
Thus, the new reduced systems are quantized using the canonical path integral approach.
This is illustrated through three examples.
Main Subjects
Topics
No. of Pages
27
Table of Contents
Table of contents.
Abstract.
Chapter one : Introduction.
Chapter two : Review of the path integral quantization.
Chapter three : The treatment of higher order regular lagrangians as first order singular lagrangians.
Chapter four : The path integral quantization of the system.
Chapter five : Conclusion.
References.
American Psychological Association (APA)
al-Suub, Ali Abd al-Qadir M.. (2007). Quantization of higher order regular lagrangians as first order singular lagrangians using path integral approach. (Master's theses Theses and Dissertations Master). Mutah University, Jordan
https://search.emarefa.net/detail/BIM-304686
Modern Language Association (MLA)
al-Suub, Ali Abd al-Qadir M.. Quantization of higher order regular lagrangians as first order singular lagrangians using path integral approach. (Master's theses Theses and Dissertations Master). Mutah University. (2007).
https://search.emarefa.net/detail/BIM-304686
American Medical Association (AMA)
al-Suub, Ali Abd al-Qadir M.. (2007). Quantization of higher order regular lagrangians as first order singular lagrangians using path integral approach. (Master's theses Theses and Dissertations Master). Mutah University, Jordan
https://search.emarefa.net/detail/BIM-304686
Language
English
Data Type
Arab Theses
Record ID
BIM-304686
