AbstractThis paper focuses on Pearson diffusions and the spectral high-order approximation of their related Fokker–Planck equations. The Pearson diffusions is a class of diffusions defined by linear drift and quadratic squared diffusion coefficient. They are widely used in the physical and chemical sciences, engineering, rheology, environmental sciences and financial mathematics. In recent years diffusion models have been studied analytically and numerically primarily through the solution of stochastic differential equations. Analytical solutions have been derived for some of the Pearson diffusions, including the Ornstein–Uhlenbeck, Cox–Ingersoll–Ross and Jacobi processes. However, analytical investigations and computations for diffusions w...
AbstractThe paper treats the problem of obtaining numerical solutions to the Fokker-Plank equation f...
This paper presents a new computational scheme for an asymptotic expansion method of an arbitrary or...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...
This paper focuses on Pearson diffusions and the spectral high-order approximation of their related ...
This paper is concerned with the numerical solution of high-dimensional Fokker- Planck equations re...
Pearson diffusions are governed by diffusion equations with polynomial coefficients. Fractional Pear...
In this paper we focus on strong solutions of some heat-like problems with a non-local derivative in...
The Pearson diffusions is a flexible class of diffusions defined by having linear drift and quadrati...
Fractional differential equations are an important and useful tool in many areas of science and engi...
This PhD thesis presents some new results on spectral properties and statistical analysis of ergodic...
nonlinear diffusion We show by explicit closed form calculations that a Hurst exponent H≠1/2 does no...
nonlinear diffusion We show by explicit closed form calculations that a Hurst exponent H≠1/2 does no...
In this paper we focus on strong solutions of some heat-like problems with a non-local derivative in...
AbstractThe paper treats the problem of obtaining numerical solutions to the Fokker-Plank equation f...
This paper presents a new computational scheme for an asymptotic expansion method of an arbitrary or...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...
This paper focuses on Pearson diffusions and the spectral high-order approximation of their related ...
This paper is concerned with the numerical solution of high-dimensional Fokker- Planck equations re...
Pearson diffusions are governed by diffusion equations with polynomial coefficients. Fractional Pear...
In this paper we focus on strong solutions of some heat-like problems with a non-local derivative in...
The Pearson diffusions is a flexible class of diffusions defined by having linear drift and quadrati...
Fractional differential equations are an important and useful tool in many areas of science and engi...
This PhD thesis presents some new results on spectral properties and statistical analysis of ergodic...
nonlinear diffusion We show by explicit closed form calculations that a Hurst exponent H≠1/2 does no...
nonlinear diffusion We show by explicit closed form calculations that a Hurst exponent H≠1/2 does no...
In this paper we focus on strong solutions of some heat-like problems with a non-local derivative in...
AbstractThe paper treats the problem of obtaining numerical solutions to the Fokker-Plank equation f...
This paper presents a new computational scheme for an asymptotic expansion method of an arbitrary or...
The Becker-Doring equations are an infinite dimensional system of ordinary differential equations de...