Path Integral Quantization of Regular Lagrangian

Ola A. Jarabah

Abstract


Path integral formulation based on the canonical method is discussed. The Hamilton Jacobi function for regular Lagrangian is obtained using separation of variables method. This function is used to quantize regular systems using path integral method. The path integral is obtained as integration over the canonical phase space coordinates. One illustrative example is considered to demonstrate the application of our formalism.


Full Text:

PDF


DOI: https://doi.org/10.5539/apr.v10n1p9

Copyright (c) 2018 Ola abedrabouh Jarab'ah

License URL: http://creativecommons.org/licenses/by/4.0

Applied Physics Research   ISSN 1916-9639 (Print)   ISSN 1916-9647 (Online)   Email: apr@ccsenet.org

Copyright © Canadian Center of Science and Education

To make sure that you can receive messages from us, please add the 'ccsenet.org' domain to your e-mail 'safe list'. If you do not receive e-mail in your 'inbox', check your 'bulk mail' or 'junk mail' folders.

images_120. proquest_logo_120 lockss_logo_2_120 udl_120.