We consider elliptic PDE eigenvalue problems on a tensorized domain, discretized such that the resulting matrix eigenvalue problem Ax=λx exhibits Kronecker product structure. In particular, we are concerned with the case of high dimensions, where standard approaches to the solution of matrix eigenvalue problems fail due to the exponentially growing degrees of freedom. Recent work shows that this curse of dimensionality can in many cases be addressed by approximating the desired solution vector x in a low-rank tensor format. In this paper, we use the hierarchical Tucker decomposition to develop a low-rank variant of LOBPCG, a classical preconditioned eigenvalue solver. We also show how the ALS and MALS (DMRG) methods known from computational...
Low-rank tensor methods for the approximate solution of second-order elliptic partial diff...
In the Davidson method, any preconditioner can be exploited for the iterative computation of eigenpa...
The numerical simulation of high-dimensional partial differential equations (PDEs) is a challenging ...
We consider approximate computation of several minimal eigenpairs of large Hermitian matrices which ...
Abstract. We consider the solution of large-scale symmetric eigenvalue problems for which it is know...
Low-rank tensor approximation techniques attempt to mitigate the overwhelming complexity of linear a...
We consider the solution of large-scale symmetric eigenvalue problems for which it is known that the...
International audienceWe propose an algorithm for preconditioning and solving high dimensional linea...
We propose a new method for the solution of discretised elliptic PDE eigenvalue problems. The new me...
This paper is concerned with the development and analysis of an iterative solver for high-dimensiona...
Computing a few eigenpairs from large-scale symmetric eigenvalue problems is far beyond the tractabi...
In this paper we propose a method for the numerical solution of linear systems of equations in low r...
The focus of this thesis is on developing efficient algorithms for two important problems arising in...
Hierarchical tensors can be regarded as a generalisation, preserving many crucial features, of the s...
We consider linear systems A(alpha)x(alpha) - b(alpha) depending on possibly many parameters alpha =...
Low-rank tensor methods for the approximate solution of second-order elliptic partial diff...
In the Davidson method, any preconditioner can be exploited for the iterative computation of eigenpa...
The numerical simulation of high-dimensional partial differential equations (PDEs) is a challenging ...
We consider approximate computation of several minimal eigenpairs of large Hermitian matrices which ...
Abstract. We consider the solution of large-scale symmetric eigenvalue problems for which it is know...
Low-rank tensor approximation techniques attempt to mitigate the overwhelming complexity of linear a...
We consider the solution of large-scale symmetric eigenvalue problems for which it is known that the...
International audienceWe propose an algorithm for preconditioning and solving high dimensional linea...
We propose a new method for the solution of discretised elliptic PDE eigenvalue problems. The new me...
This paper is concerned with the development and analysis of an iterative solver for high-dimensiona...
Computing a few eigenpairs from large-scale symmetric eigenvalue problems is far beyond the tractabi...
In this paper we propose a method for the numerical solution of linear systems of equations in low r...
The focus of this thesis is on developing efficient algorithms for two important problems arising in...
Hierarchical tensors can be regarded as a generalisation, preserving many crucial features, of the s...
We consider linear systems A(alpha)x(alpha) - b(alpha) depending on possibly many parameters alpha =...
Low-rank tensor methods for the approximate solution of second-order elliptic partial diff...
In the Davidson method, any preconditioner can be exploited for the iterative computation of eigenpa...
The numerical simulation of high-dimensional partial differential equations (PDEs) is a challenging ...