Results 131 to 140 of about 73,120 (246)
Temporal Fokker-Planck Equations
, 2016 The temporal Fokker-Plank equation [{\it J. Stat. Phys.}, {\bf 3/4}, 527 (2003)] or propagation-dispersion equation was derived to describe diffusive processes with temporal dispersion rather than spatial dispersion as in classical diffusion. %\cite{boon-grosfils-lutsko}.
Boon, Jean Pierre, Lutsko, James F.
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Eigenstate Fokker-Planck equation for magnetic nanostructures
Physical Review ResearchA Fokker-Planck equation (FPE) approach is presented to calculate the magnetization probability densities in nanomagnetic systems characterized by complex magnetization dynamics. The formulation is based on an eigenstate expansion of the solutions of the
Zhuonan Lin, Vitaliy Lomakin
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Optimal minimum variance-entropy control of tumour growth processes based on the Fokker-Planck equation. [PDF]
IET Syst Biol, 2020 Sargolzaei M +2 more
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Nonlinear Fokker-Planck Equation Approach to Systems of Interacting Particles: Thermostatistical Features Related to the Range of the Interactions. [PDF]
Entropy (Basel), 2020 Plastino AR, Wedemann RS.
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Matching and Saving in Continuous Time: Proofs [PDF]
This paper provides the proofs to the analysis of a continuous time matching model with saving in Bayer and Wälde (2010a). The paper proves the results on consumption growth, provides an existence proof for optimal consumption and a detailed derivation ...
Christian Bayer, Klaus Wälde
core
Boundary Value ProblemsIn this paper, we show that, for a solution to the stationary Fokker–Planck equation with general coefficients, defined as a measure with an L 2 $L^{2}$ -density, this density not only exhibits H 1 , 2 $H^{1,2}$ -regularity but also Hölder continuity. To
Haesung Lee
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Applying the Fokker-Planck equation to grating-based x-ray phase and dark-field imaging. [PDF]
Sci Rep, 2019 Morgan KS, Paganin DM.
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Variational structures for the Fokker-Planck equation with general Dirichlet boundary conditions. [PDF]
Calc Var Partial Differ EquQuattrocchi F.
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Fokker-Planck Equation for an Inverse-Square Force
, 1957 M. Rosenbluth, W. Macdonald, D. Judd
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