We consider the solution of elliptic problems on the tensor product of two physical domains as e.g. present in the approximation of the solution covariance of elliptic partial differential equations with random input. Previous sparse approximation approaches used a geometrically constructed multilevel hierarchy. Instead, we construct this hierarchy for a given discretized problem by means of the algebraic multigrid method (AMG). Thereby, we are able to apply the sparse grid combination technique to problems given on complex geometries and for discretizations arising from unstructured grids, which was not feasible before. Numerical results show that our algebraic construction exhibits the same convergence behaviour as the geometric construct...
: We survey some of the recent research in developing multilevel algebraic solvers for elliptic prob...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
We consider the solution of elliptic problems on the tensor product of two physical domains as for e...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Abstract. For Au = f with an elliptic differential operator A: H → H ′ and stochastic data f, the m-...
Abstract. A recurring theme in attempts to break the curse of dimensionality in the numerical approx...
A recurring theme in attempts to break the curse of dimensionality in the numerical approximation of...
Abstract. A recurring theme in attempts to break the curse of dimensionality in the numerical approx...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
A recurring theme in attempts to break the curse of dimensionality in the numerical approximations o...
Sparse tensor product spaces provide an efficient tool to discretize higher dimensional operator equ...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
AbstractSince the early 1990s, there has been a strongly increasing demand for more efficient method...
In this paper, we propose some algorithms to solve the system of linear equations arising from the f...
: We survey some of the recent research in developing multilevel algebraic solvers for elliptic prob...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
We consider the solution of elliptic problems on the tensor product of two physical domains as for e...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
Abstract. For Au = f with an elliptic differential operator A: H → H ′ and stochastic data f, the m-...
Abstract. A recurring theme in attempts to break the curse of dimensionality in the numerical approx...
A recurring theme in attempts to break the curse of dimensionality in the numerical approximation of...
Abstract. A recurring theme in attempts to break the curse of dimensionality in the numerical approx...
Multilevel quadrature methods for parametric operator equations such as the multilevel (quasi-) Mont...
A recurring theme in attempts to break the curse of dimensionality in the numerical approximations o...
Sparse tensor product spaces provide an efficient tool to discretize higher dimensional operator equ...
In this paper, we introduce and analyze a new low-rank multilevel strategy for the solution of rando...
AbstractSince the early 1990s, there has been a strongly increasing demand for more efficient method...
In this paper, we propose some algorithms to solve the system of linear equations arising from the f...
: We survey some of the recent research in developing multilevel algebraic solvers for elliptic prob...
In the recent decade, there has been growing interest in the numerical treatment of high-dimensional...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...