Maxwell's Equations and Galilean Relativity: Difference between revisions
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A short paper demonstrating how the motion dependent component in Faraday's law of electromagnetic induction can be obtained by taking the curl of the <b>v</b>x<b>B</b> component in the Lorentz force. It is then stated that the velocity term in <b>v</b>x<b>B</b> refers to the absolute velocity through a dense sea of electrons and positrons which, like the atmosphere, is entrained with the Earth's orbital motion by gravity. | A short paper demonstrating how the motion dependent component in Faraday's law of electromagnetic induction can be obtained by taking the curl of the <b>v</b>x<b>B</b> component in the Lorentz force. It is then stated that the velocity term in <b>v</b>x<b>B</b> refers to the absolute velocity through a dense sea of electrons and positrons which, like the atmosphere, is entrained with the Earth's orbital motion by gravity. | ||
[[Category:Relativity]] | [[Category:Scientific Paper|maxwell 's equations galilean relativity]] | ||
[[Category:Relativity|maxwell 's equations galilean relativity]] | |||
Latest revision as of 21:42, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Maxwell\'s Equations and Galilean Relativity |
| Author(s) | David Tombe |
| Keywords | Maxwell's Equations, Galilean Relativity |
| Published | 1984 |
| Journal | The Toth-Maatian Review |
| Volume | 2 |
| Number | 4 |
| No. of pages | 3 |
| Pages | 839-841 |
Abstract
A short paper demonstrating how the motion dependent component in Faraday's law of electromagnetic induction can be obtained by taking the curl of the vxB component in the Lorentz force. It is then stated that the velocity term in vxB refers to the absolute velocity through a dense sea of electrons and positrons which, like the atmosphere, is entrained with the Earth's orbital motion by gravity.