Difference between revisions of "Finsler Geometry and a Unified Field Theory"
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− | ''Contemporary Mathematics'', <b>196</b>: 261-272. A unified theory of gravitation and electromagnetism is developed from a type of Finsler tangent space transformation proposed long ago by Chern. The theory is in some ways similar to Kaluza-Klein theory, but has an alternate geometric foundation and also leads to some different physical interpretations. The theory produces a geodesic equation which is the Lorentz charged particle equation. It also gives Einstein field equations in which the electromagnetic energy-momentum are directly derived from the curvature.[[Category:Scientific Paper]] | + | ''Contemporary Mathematics'', <b>196</b>: 261-272. A unified theory of gravitation and electromagnetism is developed from a type of Finsler tangent space transformation proposed long ago by Chern. The theory is in some ways similar to Kaluza-Klein theory, but has an alternate geometric foundation and also leads to some different physical interpretations. The theory produces a geodesic equation which is the Lorentz charged particle equation. It also gives Einstein field equations in which the electromagnetic energy-momentum are directly derived from the curvature. |
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+ | [[Category:Scientific Paper|finsler geometry unified field theory]] | ||
[[Category:Gravity]] | [[Category:Gravity]] |
Revision as of 10:25, 1 January 2017
Scientific Paper | |
---|---|
Title | Finsler Geometry and a Unified Field Theory |
Author(s) | Ralph G Beil |
Keywords | {{{keywords}}} |
Published | 1996 |
Journal | None |
Volume | 196 |
Pages | 261-272 |
Abstract
Contemporary Mathematics, 196: 261-272. A unified theory of gravitation and electromagnetism is developed from a type of Finsler tangent space transformation proposed long ago by Chern. The theory is in some ways similar to Kaluza-Klein theory, but has an alternate geometric foundation and also leads to some different physical interpretations. The theory produces a geodesic equation which is the Lorentz charged particle equation. It also gives Einstein field equations in which the electromagnetic energy-momentum are directly derived from the curvature.