summary:The numerical solutions of stochastic partial differential equations of Itô type with time white noise process, using stable stochastic explicit finite difference methods are considered in the paper. Basically, Stochastic Alternating Direction Explicit (SADE) finite difference schemes for solving stochastic time dependent advection-diffusion and diffusion equations are represented and the main properties of these stochastic numerical methods, e.g. stability, consistency and convergence are analyzed. In particular, it is proved that when stable alternating direction explicit schemes for solving linear parabolic PDEs are developed to the stochastic case, they retain their unconditional stability properties applying to stochastic advec...
Stochastic differential equations (SDEs) models play a crucial role in many field of science such as...
We propose new explicit exponential Runge-Kutta methods for the weak approximation of solutions of s...
Les travaux exposés dans cette thèse sont consacrés à l’étude de méthodesprécises pour approcher des...
summary:The numerical solutions of stochastic partial differential equations of Itô type with time w...
Abstract. We focus on the use of two stable and accurate explicit nite dierence schemes in order to ...
This book covers numerical methods for stochastic partial differential equations with white noise us...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Abstract— Stochastic advection diffusion equation (SADE) with multiplicative stochastic input is a p...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Numerical methods for stochastic differential equations, including Taylor expansion approximations, ...
AbstractStochastic differential equations (SDEs) arise from physical systems where the parameters de...
Differential equations, especially partial differential equations (PDES) have wide range of applicat...
We propose a new numerical method for solving advection-diffusion equations with uncertainty. The st...
The topic of the talk were the time approximation of quasi linear stochastic partial differential eq...
Abstract. We consider the numerical approximation of general semilinear parabolic stochastic partial...
Stochastic differential equations (SDEs) models play a crucial role in many field of science such as...
We propose new explicit exponential Runge-Kutta methods for the weak approximation of solutions of s...
Les travaux exposés dans cette thèse sont consacrés à l’étude de méthodesprécises pour approcher des...
summary:The numerical solutions of stochastic partial differential equations of Itô type with time w...
Abstract. We focus on the use of two stable and accurate explicit nite dierence schemes in order to ...
This book covers numerical methods for stochastic partial differential equations with white noise us...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Abstract— Stochastic advection diffusion equation (SADE) with multiplicative stochastic input is a p...
Alternating-Direction Explicit (A.D.E.) finite-difference methods make use of two approximations tha...
Numerical methods for stochastic differential equations, including Taylor expansion approximations, ...
AbstractStochastic differential equations (SDEs) arise from physical systems where the parameters de...
Differential equations, especially partial differential equations (PDES) have wide range of applicat...
We propose a new numerical method for solving advection-diffusion equations with uncertainty. The st...
The topic of the talk were the time approximation of quasi linear stochastic partial differential eq...
Abstract. We consider the numerical approximation of general semilinear parabolic stochastic partial...
Stochastic differential equations (SDEs) models play a crucial role in many field of science such as...
We propose new explicit exponential Runge-Kutta methods for the weak approximation of solutions of s...
Les travaux exposés dans cette thèse sont consacrés à l’étude de méthodesprécises pour approcher des...