Structured dense matrices result from boundary integral problems in electrostatics and geostatistics, and also Schur complements in sparse preconditioners such as multi-frontal methods. Exploiting the structure of such matrices can reduce the time for dense direct factorization from $O(N^3)$ to $O(N)$. The Hierarchically Semi-Separable (HSS) matrix is one such low rank matrix format that can be factorized using a Cholesky-like algorithm called ULV factorization. The HSS-ULV algorithm is highly parallel because it removes the dependency on trailing sub-matrices at each HSS level. However, a key merge step that links two successive HSS levels remains a challenge for efficient parallelization. In this paper, we use an asynchronous runtime syst...
Abstract. Randomized sampling has recently been proven a highly efficient technique for computing ap...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
Several fine grained parallel algorithms were developed and compared to compute the Cholesky factori...
We design a distributed-memory randomized structured multifrontal solver for large sparse matrices. ...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
International audienceHierarchical matrices (H-matrices) have become important in applications where...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
Compression techniques have revolutionized the Boundary Element Method used to solve the Maxwell equ...
Abstract. Randomized sampling has recently been proven a highly efficient technique for computing ap...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...
We present a distributed-memory library for computations with dense structured matrices. A matrix is...
Factorization based preconditioning algorithms, most notably incomplete LU (ILU) factorization, have...
Hierarchically semiseparable (HSS) matrix algorithms are emerging techniques in constructing the sup...
This dissertation presents several fast and stable algorithms for both dense and sparse matrices bas...
The dissertation presents some fast direct solvers and efficient preconditioners mainly for sparse m...
Several fine grained parallel algorithms were developed and compared to compute the Cholesky factori...
We design a distributed-memory randomized structured multifrontal solver for large sparse matrices. ...
Many matrices in scientific computing, statistical inference, and machine learning exhibit sparse an...
International audienceHierarchical matrices (H-matrices) have become important in applications where...
In this paper we review the technique of hierarchical matrices and put it into the context of black-...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
Compression techniques have revolutionized the Boundary Element Method used to solve the Maxwell equ...
Abstract. Randomized sampling has recently been proven a highly efficient technique for computing ap...
We present a sparse linear system solver that is based on a multifrontal variant of Gaussian elimina...
Many problems in mathematical physics and engineering involve solving linear systems Ax = b which ar...