We analyze a-posteriori error estimation and adaptive refinement algorithms for stochastic Galerkin Finite Element methods for countablyparametric, elliptic boundary value problems. A residual error estimator which separates the effects of gpc-Galerkin discretization in parameter space and of the Finite Element discretization in physical space in energy norm is established. It is proved that the adaptive algorithm converges, and to this end we establish a contraction property satisfied by its iterates. It is shown that the sequences of triangulations which are produced by the algorithm in the FE discretization of the active gpc coefficients are asymptotically optimal. Numerical experiments illustrate the theoretical results
We consider an elliptic partial differential equation with a random diffusion parameter discretized ...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
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...
Stochastic Galerkin finite element methods (SGFEMs) are commonly used to approximate solutions to PD...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
We analyze an adaptive algorithm for the numerical solution of parametric elliptic partial different...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
We derive an adaptive solver for random elliptic boundary value problems, using techniques from adap...
summary:We introduce a new tool for obtaining efficient a posteriori estimates of errors of approxim...
Abstract We discuss several adaptive mesh-refinement strategies based on (h − h/2)-error estimation....
We present a new approach to error control and mesh adaptivity in the numerical solution of optimal ...
This paper is concerned with the design and implementation of efficient solution algorithms for ell...
The paper considers a class of parametric elliptic partial differential equations (PDEs), where the ...
We consider an elliptic partial differential equation with a random diffusion parameter discretized ...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...
This paper is concerned with the numerical approximation of quantities of interest associated with s...
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...
Stochastic Galerkin finite element methods (SGFEMs) are commonly used to approximate solutions to PD...
Equilibration error estimators have been shown to commonly lead to very accurate guaranteed error bo...
We analyze an adaptive algorithm for the numerical solution of parametric elliptic partial different...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
We derive an adaptive solver for random elliptic boundary value problems, using techniques from adap...
summary:We introduce a new tool for obtaining efficient a posteriori estimates of errors of approxim...
Abstract We discuss several adaptive mesh-refinement strategies based on (h − h/2)-error estimation....
We present a new approach to error control and mesh adaptivity in the numerical solution of optimal ...
This paper is concerned with the design and implementation of efficient solution algorithms for ell...
The paper considers a class of parametric elliptic partial differential equations (PDEs), where the ...
We consider an elliptic partial differential equation with a random diffusion parameter discretized ...
AbstractWe present a general method for error control and mesh adaptivity in Galerkin finite element...
This paper is concerned with the numerical approximation of quantities of interest associated with s...