In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of random diffusion problems. Using a standard stochastic collocation scheme, we first approximate the infinite dimensional random problem by a deterministic parameter-dependent problem on a high-dimensional parameter domain. Given a hierarchy of finite element discretizations for the spatial approximation, we make use of a multilevel framework in which we consider the differences of the solution on two consecutive finite element levels at the collocation points. We then address the approximation of these high-dimensional differences by adaptive low-rank tensor techniques. This allows to equilibrate the error on all levels by exploiting regularity an...
In this article we describe an efficient approximation of the stochastic Galerkin matrix which stems...
This thesis concerns the optimization and application of low-rank methods, with a special focus on t...
This paper examines a completely non-intrusive, sample-based method for the computation of functiona...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
International audienceTensor approximation methods are receiving a growing attention for their use i...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
International audienceIn this paper, we propose a method for the approximation of the solution of hi...
International audienceTensor methods are among the most prominent tools for the numerical solution o...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
In this paper, we propose a method for the approximation of the solution of high-dimension...
Abstract We apply the Tensor Train (TT) approximation to construct the Poly-nomial Chaos Expansion (...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
In this article we describe an efficient approximation of the stochastic Galerkin matrix which stems...
This thesis concerns the optimization and application of low-rank methods, with a special focus on t...
This paper examines a completely non-intrusive, sample-based method for the computation of functiona...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
Abstract. Stochastic collocation methods for approximating the solution of partial differential equa...
International audienceTensor approximation methods are receiving a growing attention for their use i...
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
International audienceIn this paper, we propose a method for the approximation of the solution of hi...
International audienceTensor methods are among the most prominent tools for the numerical solution o...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
The solution of PDE with stochastic data commonly leads to very high-dimensional algebraic problems,...
In this paper, we propose a method for the approximation of the solution of high-dimension...
Abstract We apply the Tensor Train (TT) approximation to construct the Poly-nomial Chaos Expansion (...
A linear PDE problem for randomly perturbed domains is considered in an adaptive Galerkin framework....
In this article we describe an efficient approximation of the stochastic Galerkin matrix which stems...
This thesis concerns the optimization and application of low-rank methods, with a special focus on t...
This paper examines a completely non-intrusive, sample-based method for the computation of functiona...