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Wealth Distribution Involving Psychological Traits and Non-Maxwellian Collision Kernel. [PDF]
Entropy (Basel)Wang D, Lai S.
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Unveiling Scale-Dependent Statistical Physics: Connecting Finite-Size and Non-Equilibrium Systems for New Insights. [PDF]
Entropy (Basel)Pérez-Madrid A, Santamaría-Holek I.
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Thermodynamic uncertainty relation for systems with active Ornstein-Uhlenbeck particles. [PDF]
PNAS NexusHan HT, Lee JS, Jeon JH.
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On Solutions of the Fokker–Planck Equations
Journal of Mathematical Sciences, 2023zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Mashtakov, A. +2 more
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LATTICE FOKKER–PLANCK EQUATION
International Journal of Modern Physics C, 2006A lattice version of the Fokker–Planck equation is introduced. The resulting numerical method is illustrated through the calculation of the electric conductivity of a one-dimensional charged fluid at zero and finite-temperature.
Succi S, Melchionna S, Hansen J P
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Quasicontinuum Fokker-Planck equation
Physical Review E, 2010Building on the work [C. R. Doering, P. S. Hagan, and P. Rosenau, Phys. Rev. A 36, 985 (1987)] we present a regularized Fokker-Planck equation for discrete-state systems with more accurate short-time behavior than its standard, Kramers-Moyal counterpart.
Francis J, Alexander, Philip, Rosenau
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On the Vlasov‐Fokker‐Planck equation
Mathematical Methods in the Applied Sciences, 1984AbstractWe study a modification of the Vlasov‐Poisson equation, obtained by adding a diffusion term with respect to velocity. It describes, from a physical point of view, a plasma in thermal equilibrium, in a mean field limit situation. We find that the already known results concerning existence and uniqueness of the solutions for the ordinary Vlasov ...
Neunzert, H., Pulvirenti, M., Triolo, L.
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Fractional Fokker–Planck equation
Chaos, Solitons & Fractals, 2000zbMATH Open Web Interface contents unavailable due to conflicting licenses.
El-Wakil, S. A., Zahran, M. A.
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2014
In the previous chapter we studied the Fokker-Planck equation in just one variable. In this chapter we analyze the Fokker-Planck equation in several variables. We consider a system described by N variables x 1, x 2, x 3, …, x N .
Tânia Tomé, Mário J. de Oliveira
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In the previous chapter we studied the Fokker-Planck equation in just one variable. In this chapter we analyze the Fokker-Planck equation in several variables. We consider a system described by N variables x 1, x 2, x 3, …, x N .
Tânia Tomé, Mário J. de Oliveira
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