An extension of electrodynamics theory to complex Lagrange geometry
2007jbu | Gh. Munteanu  // Transilvania Univ., Faculty of Mathematics and Informatics, Bra\c{s}ov, Romania, gh.munteanu@unitbv.ro

In this note our purpose is to introduce the Maxwell type equations in a complex Lagrange space, particularly in a complex Finsler space. The electromagnetic tensor fields are defined as the sum between the differential of the complex Liouville 1-form and the symplectic 2-form of the space relative to the adapted frame of Chern-Lagrange complex nonlinear connection. Is proved that the (1,1)-type electromagnetic field of a complex Finsler space vanish and the differential of the (2,0)-type electromagnetic field yields the generalized Maxwell equations. The complex electromagnetic currents are also introduced and the conditions when they are conservative are deduced. Finally we apply the results to the electrodynamics Lagrangian considered in [Mu] and to the case of complex Randers spaces.

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