We present an r-adaptivity approach for boundary value problems with randomly fluctuating material parameters solved through the Monte Carlo or stochastic collocation methods. This approach tailors a specific mesh for each sample of the problem. It only requires the computation of the solution of a single deterministic problem with the same geometry and the average parameter, whose numerical cost becomes marginal for large number of samples. Starting from the mesh used to solve that deterministic problem, the nodes are moved depending on the particular sample of mechanical parameter field. The reduction in the error is small for each sample but sums up to reduce the overall bias on the statistics estimated through the Monte Carlo schem...
1 Introduction 1 1.1 Motivation 2 1.2 Notation 4 1.3 The Darcy Model Problem 6 2 Sampling Based Meth...
This work focuses on providing accurate low-cost approximations of stochastic finite elements simula...
We present an adaptive version of the Multi-Index Monte Carlo method, introduced by Haji-Ali, Nobile...
We present an r-adaptivity approach for boundary value problems with randomly fluctuating material p...
The Monte Carlo approach in stochastic modeling requires multiple queries to numerical (typicallyfin...
The presented adaptive modelling approach aims to jointly control the level of renement for each of ...
While multilevel Monte Carlo (MLMC) methods for the numerical approximation of partial differential ...
We consider an elliptic partial differential equation with a random diffusion parameter discretized ...
Abstract: A technique for adaptive random field refinement for stochastic finite element re-liabilit...
In the framework of stochastic non-intrusive finite element modeling, a common practice is using Mon...
In this work, we consider an elliptic partial differential equation with a random coefficient solved...
A numerical method for the fully adaptive sampling and interpolation of PDE with random data is pres...
A numerical method for the fully adaptive sampling and interpolation of PDE with random data is pres...
A technique for adaptive random field refinement for stochastic finite element reliability analysis ...
In this work we present a residual based a posteriori error estimation for a heat equation with a ra...
1 Introduction 1 1.1 Motivation 2 1.2 Notation 4 1.3 The Darcy Model Problem 6 2 Sampling Based Meth...
This work focuses on providing accurate low-cost approximations of stochastic finite elements simula...
We present an adaptive version of the Multi-Index Monte Carlo method, introduced by Haji-Ali, Nobile...
We present an r-adaptivity approach for boundary value problems with randomly fluctuating material p...
The Monte Carlo approach in stochastic modeling requires multiple queries to numerical (typicallyfin...
The presented adaptive modelling approach aims to jointly control the level of renement for each of ...
While multilevel Monte Carlo (MLMC) methods for the numerical approximation of partial differential ...
We consider an elliptic partial differential equation with a random diffusion parameter discretized ...
Abstract: A technique for adaptive random field refinement for stochastic finite element re-liabilit...
In the framework of stochastic non-intrusive finite element modeling, a common practice is using Mon...
In this work, we consider an elliptic partial differential equation with a random coefficient solved...
A numerical method for the fully adaptive sampling and interpolation of PDE with random data is pres...
A numerical method for the fully adaptive sampling and interpolation of PDE with random data is pres...
A technique for adaptive random field refinement for stochastic finite element reliability analysis ...
In this work we present a residual based a posteriori error estimation for a heat equation with a ra...
1 Introduction 1 1.1 Motivation 2 1.2 Notation 4 1.3 The Darcy Model Problem 6 2 Sampling Based Meth...
This work focuses on providing accurate low-cost approximations of stochastic finite elements simula...
We present an adaptive version of the Multi-Index Monte Carlo method, introduced by Haji-Ali, Nobile...