Difference between revisions of "Michelson-Morley Result, a Voigt-Doppler Effect in Absolute Space-Time"
Jump to navigation
Jump to search
(Imported from text file) |
(Imported from text file) |
||
| (One intermediate revision by the same user not shown) | |||
| Line 10: | Line 10: | ||
==Abstract== | ==Abstract== | ||
| − | Voigt's 1887</em> <em>explanation of the Michelson-Morley result as a Doppler effect using absolute space-time is examined. It is shown that Doppler effects involve two wave velocities: 1) the phase velocity, which is used to account for the Michelson-Morley null result and 2) the velocity of energy propagation, which, being fixed relative to absolute space, may be used to explain the results of Roemer, Bradley, Sagnac, Marinov, and the 2.7<sup>o</sup>K anistropy.</em> | + | Voigt's 1887</em> <em>explanation of the Michelson-Morley result as a Doppler effect using absolute space-time is examined. It is shown that Doppler effects involve two wave velocities: 1) the phase velocity, which is used to account for the Michelson-Morley null result and 2) the velocity of energy propagation, which, being fixed relative to absolute space, may be used to explain the results of Roemer, Bradley, Sagnac, Marinov, and the 2.7<sup>o</sup>K anistropy.</em> |
| − | [[Category:Relativity]] | + | [[Category:Scientific Paper|michelson-morley result voigt-doppler effect absolute space-time]] |
| + | |||
| + | [[Category:Relativity|michelson-morley result voigt-doppler effect absolute space-time]] | ||
Latest revision as of 19:42, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Michelson-Morley Result, a Voigt-Doppler Effect in Absolute Space-Time |
| Author(s) | Paul Wesley |
| Keywords | Michelson-Morley, Voigt-Doppler, absolute space-time, wave velocities, velocity |
| Published | 1987 |
| Journal | None |
| Pages | 96-103 |
Abstract
Voigt's 1887 explanation of the Michelson-Morley result as a Doppler effect using absolute space-time is examined. It is shown that Doppler effects involve two wave velocities: 1) the phase velocity, which is used to account for the Michelson-Morley null result and 2) the velocity of energy propagation, which, being fixed relative to absolute space, may be used to explain the results of Roemer, Bradley, Sagnac, Marinov, and the 2.7oK anistropy.
