Finsler Geometry and Relativistic Field Theory

Foundations of Physics 33 (7):1107-1127 (2003)
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Abstract

Finsler geometry on the tangent bundle appears to be applicable to relativistic field theory, particularly, unified field theories. The physical motivation for Finsler structure is conveniently developed by the use of “gauge” transformations on the tangent space. In this context a remarkable correspondence of metrics, connections, and curvatures to, respectively, gauge potentials, fields, and energy-momentum emerges. Specific relativistic electromagnetic metrics such as Randers, Beil, and Weyl can be compared.

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10.1023/a:1025689902340

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Citations of this work

Gravity as a Finslerian Metric Phenomenon.Elisabetta Barletta & Sorin Dragomir - 2012 - Foundations of Physics 42 (3):436-453.

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References found in this work

Geometry of dislocated de Broglie waves.P. R. Holland - 1987 - Foundations of Physics 17 (4):345-363.
Moving frame transport and gauge transformations.R. G. Beil - 1995 - Foundations of Physics 25 (5):717-742.
Poincaré transport of frames.R. G. Beil - 1995 - Foundations of Physics 25 (11):1577-1597.

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