Heat and Maxwell's equations on cantor cubes
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Date
2017
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Editura Academiei Romane
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Abstract
The fractal physics is an important research domain due to its scaling properties that can be seen everywhere in the nature. In this work, the generalized Maxwell's equations are given using fractal differential equations on the Cantor cubes and the electric field for the fractal charge distribution is derived. Moreover, the fractal heat equation is defined, which can be an adequate mathematical model for describing the flowing of the heat energy in fractal media. The suggested models are solved and the plots of the corresponding solutions are presented. A few illustrative examples are given to demonstrate the application of the obtained results in solving diverse physical problems.
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Fractal Heat Equation, Fractal Wave Equation, Fractal Calculus, Fractal Cantor Cubes, Staircase Function
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Golmankhaneh, Alireza K; Baleanu, Dumitru, "Heat and Maxwell's equations on cantor cubes", Romanian Reports In Physics, Vol. 69, No.2, (2017).
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Source
Romanian Reports In Physics
Volume
69
Issue
2