This paper is concerned with the numerical solution of high-dimensional Fokker- Planck equations related to multi-dimensional diffusion with polynomial coefficients or Pearson diffusions. Classification of multi-dimensional Pearson diffusion follows from the classification of one-dimensional Pearson diffusion. There are six important classes of Pearson diffusion - three of them possess an infinite system of moments (Gaussian, Gamma, Beta) while the other three possess a finite number of moments (inverted Gamma, Student and Fisher-Snedecor). Numerical approximations to the solution of the Fokker-Planck equation are generated using the spectral method. The use of an adaptive reduced basis technique facilitates a significant reduction ...
We study the convergence of a nonlinear approximation method introduced in the engineering literatur...
The paper is concerned with the analysis and implementation of a spectral Galerkin method for a clas...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...
This paper is concerned with the numerical solution of high-dimensional Fokker- Planck equations re...
AbstractThis paper focuses on Pearson diffusions and the spectral high-order approximation of their ...
This paper focuses on Pearson diffusions and the spectral high-order approximation of their related ...
The numerical solution of the one-dimensional Fokker–Planck equation for describing the evolution of...
The fractional Fokker-Planck equation is an important physical model for simulating anomalous diffus...
Some Fokker/Planck/Kramers equations of current interest are solved numerically for autocorrelation ...
This paper is concerned with the analysis and implementation of spectral Galerkin methods for a clas...
In this talk, we consider a class of multiscale stochastic system for which the evolution of the pro...
We propose a numerical method for approximate the solution of a class of infinite di...
We discretize spatial domains into lattices. We provide the multivariate Fokker-Planck partial diffe...
Kinetic theory models involving the Fokker-Planck equation can be accurately discretized using a mes...
This paper is concerned with the analysis and implementation of spectral Galerkin methods for a clas...
We study the convergence of a nonlinear approximation method introduced in the engineering literatur...
The paper is concerned with the analysis and implementation of a spectral Galerkin method for a clas...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...
This paper is concerned with the numerical solution of high-dimensional Fokker- Planck equations re...
AbstractThis paper focuses on Pearson diffusions and the spectral high-order approximation of their ...
This paper focuses on Pearson diffusions and the spectral high-order approximation of their related ...
The numerical solution of the one-dimensional Fokker–Planck equation for describing the evolution of...
The fractional Fokker-Planck equation is an important physical model for simulating anomalous diffus...
Some Fokker/Planck/Kramers equations of current interest are solved numerically for autocorrelation ...
This paper is concerned with the analysis and implementation of spectral Galerkin methods for a clas...
In this talk, we consider a class of multiscale stochastic system for which the evolution of the pro...
We propose a numerical method for approximate the solution of a class of infinite di...
We discretize spatial domains into lattices. We provide the multivariate Fokker-Planck partial diffe...
Kinetic theory models involving the Fokker-Planck equation can be accurately discretized using a mes...
This paper is concerned with the analysis and implementation of spectral Galerkin methods for a clas...
We study the convergence of a nonlinear approximation method introduced in the engineering literatur...
The paper is concerned with the analysis and implementation of a spectral Galerkin method for a clas...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...