Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally block separable (HBS) matrices. Such matrices are generally dense but data sparse and can describe many important operators including those derived from asymptotically smooth radial ker-nels that are not too oscillatory. The algorithm is based on a recursive skeletonization procedure that exposes this sparsity and solves the dense least squares problem as a larger, equality-constrained, sparse one. It relies on a sparse QR factorization coupled with iterative weighted least squares meth-ods. In essence, our scheme consists of a direct component, comprised of matrix compression and factorization, followed by an iterative component to enforce c...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
In this paper we present two versions of a parallel algorithm to solve the block–Toeplitz least-squa...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
. The linear least squares problem arises in many areas of sciences and engineerings. When the coef...
Abstract. Randomized sampling has recently been proven a highly efficient technique for computing ap...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
A randomized algorithm for computing a compressed representation of a given rank structured matrix $...
Sparse linear least squares problems containing a few relatively dense rows occur frequently in prac...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Abstract — In this paper, we study an important class of struc-tured matrices: ”Hierarchically Semi-...
AbstractWe present a new parallel algorithm for computing a least-squares solution to a sparse overd...
The nonlinear least squares problem m i n y , z ∥ A ( y ) z + b ( y ) ∥ , where ...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
If A is the (sparse) coefficient matrix of linear equality constraints, for what nonsingular T is fi...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
In this paper we present two versions of a parallel algorithm to solve the block–Toeplitz least-squa...
Abstract. We present a fast algorithm for linear least squares problems governed by hierarchi-cally ...
. The linear least squares problem arises in many areas of sciences and engineerings. When the coef...
Abstract. Randomized sampling has recently been proven a highly efficient technique for computing ap...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
A randomized algorithm for computing a compressed representation of a given rank structured matrix $...
Sparse linear least squares problems containing a few relatively dense rows occur frequently in prac...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
Abstract — In this paper, we study an important class of struc-tured matrices: ”Hierarchically Semi-...
AbstractWe present a new parallel algorithm for computing a least-squares solution to a sparse overd...
The nonlinear least squares problem m i n y , z ∥ A ( y ) z + b ( y ) ∥ , where ...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
If A is the (sparse) coefficient matrix of linear equality constraints, for what nonsingular T is fi...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
In this paper we present two versions of a parallel algorithm to solve the block–Toeplitz least-squa...