Abstract. Randomized sampling has recently been proven a highly efficient technique for computing approximate factorizations of matrices that have low numerical rank. This paper describes an extension of such techniques to a wider class of matrices that are not themselves rank-deficient but have off-diagonal blocks that are; specifically, the class of so-called hierarchically semiseparable (HSS) matrices. HSS matrices arise frequently in numerical analysis and signal processing, particularly in the construction of fast methods for solving differential and integral equations numerically. The HSS structure admits algebraic operations (matrix-vector multiplications, matrix factorizations, matrix inversion, etc.) to be performed very rapidly, b...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
A randomized algorithm for computing a data sparse representation of a given rank structured matrix ...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
We develop a hierarchical matrix construction algorithm using matrix-vector multiplications, based o...
In this thesis, we study a important class of structured matrices: "Hierarchically Semi-Separable" m...
Abstract. We propose a superfast solver for Toeplitz linear systems based on rank structured matrix ...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
A randomized algorithm for computing a compressed representation of a given rank structured matrix $...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
A randomized algorithm for computing a data sparse representation of a given rank structured matrix ...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Abstract. In this paper, we consider a class of hierarchically rank structured matrices that include...
We develop a hierarchical matrix construction algorithm using matrix-vector multiplications, based o...
In this thesis, we study a important class of structured matrices: "Hierarchically Semi-Separable" m...
Abstract. We propose a superfast solver for Toeplitz linear systems based on rank structured matrix ...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
The purpose of this text is to provide an accessible introduction to a set of recently developed alg...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Matrices of huge size and low rank are encountered in applications from the real world where large s...
A randomized algorithm for computing a compressed representation of a given rank structured matrix $...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
A randomized algorithm for computing a data sparse representation of a given rank structured matrix ...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...