The paper considers a class of parametric elliptic partial differential equations (PDEs), where the coefficients and the right-hand side function depend on infinitely many (uncertain) parameters. We introduce a two-level a posteriori estimator to control the energy error in multilevel stochastic Galerkin approximations for this class of PDE problems. We prove that the two-level estimator always provides a lower bound for the unknown approximation error, while the upper bound is equivalent to a saturation assumption. We propose and empirically compare three adaptive algorithms, where the structure of the estimator is exploited to perform spatial refinement as well as parametric enrichment. The paper also discusses implementation aspects of c...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin finite element methods (SGFEMs) are commonly used to approximate solutions to PD...
We analyze an adaptive algorithm for the numerical solution of parametric elliptic partial different...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
In this thesis, we focus on the design of efficient adaptive algorithms for the numerical approximat...
We use the ideas of goal-oriented error estimation and adaptivity to design and implement an efficie...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
We analyze a-posteriori error estimation and adaptive refinement algorithms for stochastic Galerkin ...
A framework for residual-based a posteriori error estimation and adaptive mesh refinement and polyno...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
In this work, we consider an elliptic partial differential equation (PDE) with a random coefficient ...
Stochastic Galerkin approximation is an increasingly popular approach for the solution of elliptic P...
The focus of this work is the introduction of some computable a posteriori error control to the popu...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin finite element methods (SGFEMs) are commonly used to approximate solutions to PD...
We analyze an adaptive algorithm for the numerical solution of parametric elliptic partial different...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
In this thesis, we focus on the design of efficient adaptive algorithms for the numerical approximat...
We use the ideas of goal-oriented error estimation and adaptivity to design and implement an efficie...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
We analyze a-posteriori error estimation and adaptive refinement algorithms for stochastic Galerkin ...
A framework for residual-based a posteriori error estimation and adaptive mesh refinement and polyno...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
In this work, we consider an elliptic partial differential equation (PDE) with a random coefficient ...
Stochastic Galerkin approximation is an increasingly popular approach for the solution of elliptic P...
The focus of this work is the introduction of some computable a posteriori error control to the popu...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin finite element methods (SGFEMs) are commonly used to approximate solutions to PD...