Relativistic Hertz-Debye Potentials: Difference between revisions
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We prove that the Hertz-Debye vectors used to get the solutions of Maxwell?s equations in homogeneous isotropic media are the components of a self-dual tensor with as consequence to supply a relativistic generalization of Hertz-Debye potentials usable to solve the relativistic Maxwell equations. An application is given to electromagnetic Courant-Hilbert progressing waves in free space. | We prove that the Hertz-Debye vectors used to get the solutions of Maxwell?s equations in homogeneous isotropic media are the components of a self-dual tensor with as consequence to supply a relativistic generalization of Hertz-Debye potentials usable to solve the relativistic Maxwell equations. An application is given to electromagnetic Courant-Hilbert progressing waves in free space. | ||
[[Category:Scientific Paper]] | [[Category:Scientific Paper|relativistic hertz-debye potentials]] | ||
[[Category:Relativity]] | [[Category:Relativity|relativistic hertz-debye potentials]] | ||
Latest revision as of 21:52, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Relativistic Hertz-Debye Potentials |
| Author(s) | Pierre Hillion |
| Keywords | {{{keywords}}} |
| Published | 2010 |
| Journal | Galilean Electrodynamics |
| Volume | 21 |
| Number | 1 |
| Pages | 9-12 |
Abstract
We prove that the Hertz-Debye vectors used to get the solutions of Maxwell?s equations in homogeneous isotropic media are the components of a self-dual tensor with as consequence to supply a relativistic generalization of Hertz-Debye potentials usable to solve the relativistic Maxwell equations. An application is given to electromagnetic Courant-Hilbert progressing waves in free space.