International audienceThis paper presents two approaches using a Block Low-Rank (BLR) compression technique to reduce the memory footprint and/or the time-to-solution of the sparse supernodal solver PaStiX. This flat, non-hierarchical, compression method allows to take advantage of the low-rank property of the blocks appearing during the factorization of sparse linear systems, which come from the discretization of partial differential equations. The first approach, called Minimal Memory, illustrates the maximum memory gain that can be obtained with the BLR compression method, while the second approach, called Just-In-Time, mainly focuses on reducing the computational complexity and thus the time-to-solution. Singular Value Decomposition (SV...
National audienceIn this talk, we present the use of PaStiX sparse direct solver in a Schwarz method...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
This paper presents two approaches using a Block Low-Rank (BLR) compression technique to reduce the ...
International audienceThis paper presents two approaches using a Block Low-Rank (BLR) compression te...
This paper presents two approaches using a Block Low-Rank (BLR) compressiontechnique to reduce the m...
International audienceLow-rank compression techniques are very promising for reducing memory footpri...
International audienceIn this talk, we present the PaStiX sparse supernodal solver, using hierarchic...
Through the recent improvements toward exascale supercomputer systems, huge computations can be perf...
International audienceSparse direct solvers using Block Low-Rank compression have been proven effici...
International audienceIn this talk, we present the PaStiX sparse supernodal solver, using hierarchic...
International audienceSolving linear equations of type Ax=b for large sparse systems frequently emer...
Solving sparse linear systems is a problem that arises in many scientific applications, and sparse d...
International audienceIn this talk, we describe a preliminary fast direct solver using HODLR library...
International audienceIn the context of solving sparse linear systems, an ordering process partition...
National audienceIn this talk, we present the use of PaStiX sparse direct solver in a Schwarz method...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...
This paper presents two approaches using a Block Low-Rank (BLR) compression technique to reduce the ...
International audienceThis paper presents two approaches using a Block Low-Rank (BLR) compression te...
This paper presents two approaches using a Block Low-Rank (BLR) compressiontechnique to reduce the m...
International audienceLow-rank compression techniques are very promising for reducing memory footpri...
International audienceIn this talk, we present the PaStiX sparse supernodal solver, using hierarchic...
Through the recent improvements toward exascale supercomputer systems, huge computations can be perf...
International audienceSparse direct solvers using Block Low-Rank compression have been proven effici...
International audienceIn this talk, we present the PaStiX sparse supernodal solver, using hierarchic...
International audienceSolving linear equations of type Ax=b for large sparse systems frequently emer...
Solving sparse linear systems is a problem that arises in many scientific applications, and sparse d...
International audienceIn this talk, we describe a preliminary fast direct solver using HODLR library...
International audienceIn the context of solving sparse linear systems, an ordering process partition...
National audienceIn this talk, we present the use of PaStiX sparse direct solver in a Schwarz method...
Submitted for publication to SIAMMatrices coming from elliptic Partial Differential Equations (PDEs)...
. For a sparse linear system Ax = b, preconditioners of the form C = D + L + U , where D is the blo...