AbstractMany of today’s most efficient numerical methods are based on multilevel decompositions: The multigrid algorithm is based on a hierarchy of grids, wavelet techniques use a hierarchy of basis functions, while fast panel-clustering and multipole methods employ a hierarchy of clusters.The high efficiency of these methods is due to the fact that the hierarchies are nested, i.e., that the information present on a coarser level is also present on finer levels, thus allowing efficient recursive algorithms.H2-matrices employ nested local expansion systems in order to approximate matrices in optimal (or for some problem classes at least optimal up to logarithmic factors) order of complexity. This paper presents a criterion for the approximab...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
Abstract. A new fast algebraic method for obtaining an H2-approximation of a matrix from its entries...
Discretizing an integral operator by a standard finite element or boundary element method typically ...
summary:We give a short introduction to a method for the data-sparse approximation of matrices resul...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
AbstractIn a preceding paper (Hackbusch, Computing 62 (1999) 89–108), a class of matrices (H-matrice...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
A class of hierarchical matrices (H-matrices) allows the data-sparse approximation to integral and m...
International audienceThe computational cost of many signal processing and machine learning techniqu...
The class of H-matrices allows an approximate matrix arithmetic with almost linear complexity. In th...
A number of problems in system theory, signal processing, and computer algebra fit into a generic st...
The multiplication of matrices is an important arithmetic operation in computational mathematics. In...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
Abstract. A new fast algebraic method for obtaining an H2-approximation of a matrix from its entries...
Discretizing an integral operator by a standard finite element or boundary element method typically ...
summary:We give a short introduction to a method for the data-sparse approximation of matrices resul...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
AbstractIn a preceding paper (Hackbusch, Computing 62 (1999) 89–108), a class of matrices (H-matrice...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
A class of hierarchical matrices (H-matrices) allows the data-sparse approximation to integral and m...
International audienceThe computational cost of many signal processing and machine learning techniqu...
The class of H-matrices allows an approximate matrix arithmetic with almost linear complexity. In th...
A number of problems in system theory, signal processing, and computer algebra fit into a generic st...
The multiplication of matrices is an important arithmetic operation in computational mathematics. In...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...