The probability density function (PDF) of a random variable associated with the solution of a partial differential equation (PDE) with random parameters is approximated using a truncated series expansion. The random PDE is solved using two stochastic finite element methods, Monte Carlo sampling and the stochastic Galerkin method with global polynomials. The random variable is a functional of the solution of the random PDE, such as the average over the physical domain. The truncated series are obtained considering a finite number of terms in the Gram–Charlier or Edgeworth series expansions. These expansions approximate the PDF of a random variable in terms of another PDF, and involve coefficients that are functions of the known cumulants of ...
In this paper quasi-Monte Carlo (QMC) methods are applied to a class of elliptic partial differentia...
We devise and implement quasi-Monte Carlo methods for computing the expectations of nonlinear functi...
In this thesis we construct novel functional representations for the Probability Density Functions (...
In this paper we study the randomized heat equation with homo- geneous boundary conditions. The dif...
We consider the problem of numerically approximating statistical moments of the solution of a time-d...
[EN] Solving a random differential equation means to obtain an exact or approximate expression for t...
This book gives a comprehensive introduction to numerical methods and analysis of stochastic process...
Mathematical models of engineering systems and physical processes typically take the form of a parti...
This paper deals with the damped pendulum random differential equation: X¨(t)+2ω0ξX˙(t) + ω 2 0 ...
International audienceThis paper concerns the analysis of random second order linear differential eq...
In this paper we propose and analyze a stochastic collocation method to solve elliptic partial diffe...
Randomness in a physical problem can be modelled with probabilistic models such as stochastic partia...
This paper considers the analysis of partial differential equations (PDE) containing multiple random...
A simulation based method for the numerical solution of PDE with random coefficients is presented. ...
We construct stochastic Galerkin approximations to the solution of a first order system of PDEs with...
In this paper quasi-Monte Carlo (QMC) methods are applied to a class of elliptic partial differentia...
We devise and implement quasi-Monte Carlo methods for computing the expectations of nonlinear functi...
In this thesis we construct novel functional representations for the Probability Density Functions (...
In this paper we study the randomized heat equation with homo- geneous boundary conditions. The dif...
We consider the problem of numerically approximating statistical moments of the solution of a time-d...
[EN] Solving a random differential equation means to obtain an exact or approximate expression for t...
This book gives a comprehensive introduction to numerical methods and analysis of stochastic process...
Mathematical models of engineering systems and physical processes typically take the form of a parti...
This paper deals with the damped pendulum random differential equation: X¨(t)+2ω0ξX˙(t) + ω 2 0 ...
International audienceThis paper concerns the analysis of random second order linear differential eq...
In this paper we propose and analyze a stochastic collocation method to solve elliptic partial diffe...
Randomness in a physical problem can be modelled with probabilistic models such as stochastic partia...
This paper considers the analysis of partial differential equations (PDE) containing multiple random...
A simulation based method for the numerical solution of PDE with random coefficients is presented. ...
We construct stochastic Galerkin approximations to the solution of a first order system of PDEs with...
In this paper quasi-Monte Carlo (QMC) methods are applied to a class of elliptic partial differentia...
We devise and implement quasi-Monte Carlo methods for computing the expectations of nonlinear functi...
In this thesis we construct novel functional representations for the Probability Density Functions (...