In this paper, a review of the low-rank factorization method is presented, with emphasis on their application to multiscale problems. Low-rank matrix factorization methods exploit the rankdeficient nature of coupling impedance matrix blocks between two separated groups. They are widely used, because they are purely algebraic and kernel free. To improve the computation precision and efficiency of low-rank based methods, the improved sampling technologies of adaptive cross approximation (ACA), post compression methods, and the nested low-rank factorizations are introduced. {mathrm {O}}(N) and {mathrm {O}}(N log N) computation complexity of the nested equivalence source approximation can be achieved in low and high frequency regime, which is p...
International audienceMatrices coming from elliptic Partial Differential Equations (PDEs) have been ...
Low rank approximation is the problem of finding two low rank factors W and H such that the rank(WH)...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
In this paper, a review of the low-rank factorization method is presented, with emphasis on their ap...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
The development of randomized algorithms for numerical linear algebra, e.g. for computing approximat...
Low-rank approximations play an important role in systems theory and signal processing. The prob-lem...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
Low rank matrix factorization is an important step in many high dimensional machine learning algorit...
This paper examines numerical algorithms for factoriza-tion of a low-rank matrix with missing compon...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
This article deals with the solution of integral equations using collocation methods with almost lin...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
International audienceMatrices coming from elliptic Partial Differential Equations (PDEs) have been ...
Low rank approximation is the problem of finding two low rank factors W and H such that the rank(WH)...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
In this paper, a review of the low-rank factorization method is presented, with emphasis on their ap...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
The development of randomized algorithms for numerical linear algebra, e.g. for computing approximat...
Low-rank approximations play an important role in systems theory and signal processing. The prob-lem...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
Low rank matrix factorization is an important step in many high dimensional machine learning algorit...
This paper examines numerical algorithms for factoriza-tion of a low-rank matrix with missing compon...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
This article deals with the solution of integral equations using collocation methods with almost lin...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
Matrix low-rank approximation is intimately related to data modelling; a problem that arises frequen...
International audienceMatrices coming from elliptic Partial Differential Equations (PDEs) have been ...
Low rank approximation is the problem of finding two low rank factors W and H such that the rank(WH)...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...