AbstractLeast Squares with QR-factorization (LSQR) method is a widely used Krylov subspace algorithm to solve sparse rectangu- lar linear systems for tomographic problems. Traditional parallel implementations of LSQR have the potential, depending on the non-zero structure of the matrix, to have significant communication cost. The communication cost can dramatically limit the scalability of the algorithm at large core counts. We describe a scalable parallel LSQR algorithm that utilizes the particular non-zero structure of matrices that occurs in tomographic problems. In particular, we specially treat the kernel component of the matrix, which is relatively dense with a random structure, and the damping component, which is very sparse and high...
We present a parallel distributed solver that enables us to solve incremental dense least squares ar...
AbstractThe paper brings a massively parallel Poisson solver for rectangle domain and parallel algor...
AbstractThis paper discusses an extension of the pipelined Givens method for computing the QR factor...
Inverse problems Parallel scientific computing a b s t r a c t The LSQR algorithm developed by Paige...
AbstractLSQR (Sparse Equations and Least Squares) is a widely used Krylov subspace method to solve l...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
International audienceWe present a new approach to reduce a sparse, linear system of equations assoc...
Tomography in seismology often leads to underdetermined and inconsistent systems of linear equations...
A fast technological progress is providing seismic tomographers with computers of rapidly increasin...
AbstractA new algorithm is presented for the efficient solution of large least squares problems in w...
The LSQR algorithm is a popular Krylov subspace method for obtaining solutions to large–scale least–...
. We present a parallel algorithm for the QR decomposition with column pivoting of a sparse matrix b...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
The bulge-chasing kernel in the small-bulge multi-shift QR algorithm for the non-symmetric dense eig...
International audienceWe introduce and compare new compression approaches to obtain regularized solu...
We present a parallel distributed solver that enables us to solve incremental dense least squares ar...
AbstractThe paper brings a massively parallel Poisson solver for rectangle domain and parallel algor...
AbstractThis paper discusses an extension of the pipelined Givens method for computing the QR factor...
Inverse problems Parallel scientific computing a b s t r a c t The LSQR algorithm developed by Paige...
AbstractLSQR (Sparse Equations and Least Squares) is a widely used Krylov subspace method to solve l...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
International audienceWe present a new approach to reduce a sparse, linear system of equations assoc...
Tomography in seismology often leads to underdetermined and inconsistent systems of linear equations...
A fast technological progress is providing seismic tomographers with computers of rapidly increasin...
AbstractA new algorithm is presented for the efficient solution of large least squares problems in w...
The LSQR algorithm is a popular Krylov subspace method for obtaining solutions to large–scale least–...
. We present a parallel algorithm for the QR decomposition with column pivoting of a sparse matrix b...
International audienceIn this paper, we revisit the Krylov multisplitting algorithm presented in Hua...
The bulge-chasing kernel in the small-bulge multi-shift QR algorithm for the non-symmetric dense eig...
International audienceWe introduce and compare new compression approaches to obtain regularized solu...
We present a parallel distributed solver that enables us to solve incremental dense least squares ar...
AbstractThe paper brings a massively parallel Poisson solver for rectangle domain and parallel algor...
AbstractThis paper discusses an extension of the pipelined Givens method for computing the QR factor...