Lie symmetries and conservation laws of the Fokker-Planck equation with power diffusion |
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Authors: | Zhi-Yong Zhang Jia Zheng Lei-Lei Guo Hong-Feng Wu |
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Affiliation: | 1. College of Science, Minzu University of China, Beijing, P.R. China;2. College of Science, North China University of Technology, Beijing, P.R. China |
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Abstract: | We concentrate on Lie symmetries and conservation laws of the Fokker-Planck equation with power diffusion describing the growth of cell populations. First, we perform a complete symmetry classification of the equation, and then we find some interesting similarity solutions by means of the symmetries and the variable coefficient heat equation. Local dynamical behaviors are analyzed via the solutions for the growing cell populations. Second, we show that the conservation law multipliers of the equation take the form Λ=Λ(t,x,u), which satisfy a linear partial differential equation, and then give the general formula of conservation laws. Finally, symmetry properties of the conservation law are investigated and used to construct conservation laws of the reduced equations. |
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Keywords: | conservation law Fokker-Planck equation growing cell populations Lie symmetry symmetry property |
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