AbstractFor parametrised equations, which arise, for example, in equations dependent on random parameters, the solution naturally lives in a tensor product space. The application which we have in mind is a stochastic linear elliptic partial differential equation (SPDE). Usual spatial discretisation leads to a potentially large linear system for each point in the parameter space. Approximating the parametric dependence by a Galerkin ‘ansatz’, the already large number of unknowns—for a fixed parameter value—is multiplied by the dimension of the Galerkin subspace for the parametric dependence, and thus can be very large. Therefore, we try to solve the total system approximately on a smaller submanifold which is found adaptively through compres...
Stochastic Galerkin finite element approximation of PDEs with random inputs leads to linear systems ...
In this work we first focus on the Stochastic Galerkin approximation of the solution $u$ of an ellip...
The numerical approximation of partial differential equations (PDEs) poses formidable challenges in ...
Spektrale stochastische Methoden haben sich als effizientes Werkzeug zur Modellierung von Systemen m...
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,...
Partial differential equations (PDEs) with random input data, such as random loadings and coefficien...
Otto-von-Guericke-Universität Magdeburg, Fakultät für Mathematik, Dissertation, 2016von Dr. rer. pol...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
International audienceIn this paper, we propose a method for the approximation of the solution of hi...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
In this paper, we propose a method for the approximation of the solution of high-dimension...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
2013-08-02This dissertation focuses on facilitating the analysis of probabilistic models for physica...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin finite element approximation of PDEs with random inputs leads to linear systems ...
In this work we first focus on the Stochastic Galerkin approximation of the solution $u$ of an ellip...
The numerical approximation of partial differential equations (PDEs) poses formidable challenges in ...
Spektrale stochastische Methoden haben sich als effizientes Werkzeug zur Modellierung von Systemen m...
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,...
Partial differential equations (PDEs) with random input data, such as random loadings and coefficien...
Otto-von-Guericke-Universität Magdeburg, Fakultät für Mathematik, Dissertation, 2016von Dr. rer. pol...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
International audienceIn this paper, we propose a method for the approximation of the solution of hi...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
In this paper, we propose a method for the approximation of the solution of high-dimension...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
2013-08-02This dissertation focuses on facilitating the analysis of probabilistic models for physica...
Numerical methods for random parametric PDEs can greatly benefit from adaptive refinement schemes, i...
Stochastic Galerkin finite element approximation of PDEs with random inputs leads to linear systems ...
In this work we first focus on the Stochastic Galerkin approximation of the solution $u$ of an ellip...
The numerical approximation of partial differential equations (PDEs) poses formidable challenges in ...