Difference between revisions of "Inertial Transformation Extended to the General Case"
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==Abstract== | ==Abstract== | ||
− | The assumption of a privileged frame of reference entails a special type of transformation, different from the Lorentz transformation. The simplest form of this special type, here called ?inertial transformation? (IT), applies to the special case where one system is privileged. The present paper deduces the general type of inertial transformation, including cases of both systems in absolute motion, with their absolute velocity vectors directed relative to each other at any angle between 0 and (Pi). | + | The assumption of a privileged frame of reference entails a special type of transformation, different from the Lorentz transformation. The simplest form of this special type, here called ?inertial transformation? (IT), applies to the special case where one system is privileged. The present paper deduces the general type of inertial transformation, including cases of both systems in absolute motion, with their absolute velocity vectors directed relative to each other at any angle between 0 and (Pi). |
− | [[Category:Relativity]] | + | [[Category:Scientific Paper|inertial transformation extended general case]] |
+ | |||
+ | [[Category:Relativity|inertial transformation extended general case]] |
Latest revision as of 19:38, 1 January 2017
Scientific Paper | |
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Title | Inertial Transformation Extended to the General Case |
Author(s) | Maciej Rybicki |
Keywords | {{{keywords}}} |
Published | 2010 |
Journal | Galilean Electrodynamics |
Volume | 21 |
Number | S1 |
Pages | 8-10 |
Abstract
The assumption of a privileged frame of reference entails a special type of transformation, different from the Lorentz transformation. The simplest form of this special type, here called ?inertial transformation? (IT), applies to the special case where one system is privileged. The present paper deduces the general type of inertial transformation, including cases of both systems in absolute motion, with their absolute velocity vectors directed relative to each other at any angle between 0 and (Pi).