Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, in particular when functional approximations are computed as in stochastic Galerkin and stochastic collocations methods. This work is concerned with a non-intrusive generalization of the adaptive Galerkin FEM with residual based error estimation. It combines the non-intrusive character of a randomized least-squares method with the a posteriori error analysis of stochastic Galerkin methods. The proposed approach uses the Variational Monte Carlo method to obtain a quasi-optimal low-rank approximation of the Galerkin projection in a highly efficient hierarchical tensor format. We derive an adaptive refinement algorithm which is steered by a relia...
Convergence of an adaptive collocation method for the stationary parametric diffusion equation with ...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin methods for non-affine coefficient representations are known to cause major diff...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
In this thesis, we focus on the design of efficient adaptive algorithms for the numerical approximat...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
This paper examines a completely non-intrusive, sample-based method for the computation of functiona...
We analyze a-posteriori error estimation and adaptive refinement algorithms for stochastic Galerkin ...
A statistical learning approach for parametric PDEs related to Uncertainty Quantification is derived...
A statistical learning approach for parametric PDEs related to Uncertainty Quantification is derived...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Convergence of an adaptive collocation method for the stationary parametric diffusion equation with ...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin methods for non-affine coefficient representations are known to cause major diff...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
In this thesis, we focus on the design of efficient adaptive algorithms for the numerical approximat...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
This paper examines a completely non-intrusive, sample-based method for the computation of functiona...
We analyze a-posteriori error estimation and adaptive refinement algorithms for stochastic Galerkin ...
A statistical learning approach for parametric PDEs related to Uncertainty Quantification is derived...
A statistical learning approach for parametric PDEs related to Uncertainty Quantification is derived...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Convergence of an adaptive collocation method for the stationary parametric diffusion equation with ...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
This paper is concerned with the numerical approximation of quantities of interest associated with s...