Introduction
Solvers of linear systems are one of the most important algorithms in scientific computations. TNL offers the following iterative methods:
- Stationary methods
- Jacobi method (TNL::Solvers::Linear::Jacobi)
- Successive-overrelaxation method, SOR (TNL::Solvers::Linear::SOR)
- Krylov subspace methods
- Conjugate gradient method, CG (TNL::Solvers::Linear::CG)
- Biconjugate gradient stabilized method, BICGStab (TNL::Solvers::Linear::BICGStab)
- Biconjugate gradient stabilized method, BICGStab(l) (TNL::Solvers::Linear::BICGStabL)
- Transpose-free quasi-minimal residual method, TFQMR (TNL::Solvers::Linear::TFQMR)
- Generalized minimal residual method, GMRES (TNL::Solvers::Linear::GMRES) with various methods of orthogonalization:
- Classical Gramm-Schmidt, CGS
- Classical Gramm-Schmidt with reorthogonalization, CGSR
- Modified Gramm-Schmidt, MGS
- Modified Gramm-Schmidt with reorthogonalization, MGSR
- Compact WY form of the Householder reflections, CWY
The iterative solvers (not the stationary solvers like TNL::Solvers::Linear::Jacobi and TNL::Solvers::Linear::SOR) can be combined with the following preconditioners:
- Diagonal or Jacobi (TNL::Solvers::Linear::Preconditioners::Diagonal)
- ILU (Incomplete LU) - CPU only currently
- ILU(0) (TNL::Solvers::Linear::Preconditioners::ILU0)
- ILUT (ILU with thresholding) (TNL::Solvers::Linear::Preconditioners::ILUT)
Iterative solvers of linear systems
Basic setup
All iterative solvers for linear systems can be found in the namespace TNL::Solvers::Linear. The following example shows the use the iterative solvers:
3#include <TNL/Matrices/SparseMatrix.h>
4#include <TNL/Devices/Host.h>
5#include <TNL/Devices/Cuda.h>
6#include <TNL/Solvers/Linear/TFQMR.h>
8template<
typename Device >
10iterativeLinearSolverExample()
24 auto matrix_ptr = std::make_shared< MatrixType >();
25 matrix_ptr->setDimensions( size, size );
26 matrix_ptr->setRowCapacities( Vector( { 2, 3, 3, 3, 2 } ) );
30 const int rowIdx = row.getRowIndex();
32 row.setElement( 0, rowIdx, 2.5 );
33 row.setElement( 1, rowIdx + 1, -1 );
35 else if( rowIdx == size - 1 ) {
36 row.setElement( 0, rowIdx - 1, -1.0 );
37 row.setElement( 1, rowIdx, 2.5 );
40 row.setElement( 0, rowIdx - 1, -1.0 );
41 row.setElement( 1, rowIdx, 2.5 );
42 row.setElement( 2, rowIdx + 1, -1.0 );
49 matrix_ptr->forAllRows( f );
55 Vector x( size, 1.0 );
57 matrix_ptr->vectorProduct( x, b );
67 solver.setConvergenceResidue( 1.0e-6 );
73main(
int argc,
char* argv[] )
76 iterativeLinearSolverExample< TNL::Devices::Sequential >();
80 iterativeLinearSolverExample< TNL::Devices::Cuda >();
#define __cuda_callable__
Definition Macros.h:49
Vector extends Array with algebraic operations.
Definition Vector.h:36
Implementation of sparse matrix, i.e. matrix storing only non-zero elements.
Definition SparseMatrix.h:57
void setMatrix(const MatrixPointer &matrix)
Set the matrix of the linear system.
Definition LinearSolver.h:120
Iterative solver of linear systems based on the Transpose-free quasi-minimal residual (TFQMR) method.
Definition TFQMR.h:21
In this example we solve a linear system \( A \vec x = \vec b \) where
\[
A = \left(
\begin{array}{cccc}
2.5 & -1 & & & \\
-1 & 2.5 & -1 & & \\
& -1 & 2.5 & -1 & \\
& & -1 & 2.5 & -1 \\
& & & -1 & 2.5 \\
\end{array}
\right)
\]
The right-hand side vector \(\vec b \) is set to \(( 1.5, 0.5, 0.5, 0.5, 1.5 )^T \) so that the exact solution is \( \vec x = ( 1, 1, 1, 1, 1 )^T \). The elements of the matrix \( A \) are set using the method TNL::Matrices::SparseMatrix::forAllRows. In this example, we use the sparse matrix but any other matrix type can be used as well (see the namespace TNL::Matrices). Next we set the solution vector \( \vec x = ( 1, 1, 1, 1, 1 )^T \) and multiply it with matrix \( A \) to get the right-hand side vector \( \vec b \). Finally, we reset the vector \( \vec x \) to zero.
To solve the linear system in the example, we use the TFQMR solver. Other solvers can be used as well (see the namespace TNL::Solvers::Linear). The solver needs only one template parameter which is the matrix type. Next we create an instance of the solver and set the matrix of the linear system. Note that the matrix is passed to the solver as a std::shared_ptr. Then we set the stopping criterion for the iterative method in terms of the relative residue, i.e. \( \lVert \vec b - A \vec x \rVert / \lVert b \rVert \). The solver is executed by calling the TNL::Solvers::Linear::LinearSolver::solve method which accepts the right-hand side vector \( \vec b \) and the solution vector \( \vec x \).
The result looks as follows:
Solving linear system on host:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
Solving linear system on CUDA device:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
Setup with a solver monitor
Solution of large linear systems may take a lot of time. In such situations, it is useful to be able to monitor the convergence of the solver or the solver status in general. For this purpose, TNL provides a solver monitor which can show various metrics in real time, such as current number of iterations, current residue of the approximate solution, etc. The solver monitor in TNL runs in a separate thread and it refreshes the status of the solver with a configurable refresh rate (once per 500 ms by default). The use of the solver monitor is demonstrated in the following example.
5#include <TNL/Matrices/SparseMatrix.h>
6#include <TNL/Devices/Sequential.h>
7#include <TNL/Devices/Cuda.h>
8#include <TNL/Solvers/Linear/Jacobi.h>
10template<
typename Device >
12iterativeLinearSolverExample()
26 auto matrix_ptr = std::make_shared< MatrixType >();
27 matrix_ptr->setDimensions( size, size );
28 matrix_ptr->setRowCapacities( Vector( { 2, 3, 3, 3, 2 } ) );
32 const int rowIdx = row.getRowIndex();
34 row.setElement( 0, rowIdx, 2.5 );
35 row.setElement( 1, rowIdx + 1, -1 );
37 else if( rowIdx == size - 1 ) {
38 row.setElement( 0, rowIdx - 1, -1.0 );
39 row.setElement( 1, rowIdx, 2.5 );
42 row.setElement( 0, rowIdx - 1, -1.0 );
43 row.setElement( 1, rowIdx, 2.5 );
44 row.setElement( 2, rowIdx + 1, -1.0 );
51 matrix_ptr->forAllRows( f );
57 Vector x( size, 1.0 );
59 matrix_ptr->vectorProduct( x, b );
69 solver.setOmega( 0.0005 );
75 IterativeSolverMonitorType monitor;
77 monitor.setRefreshRate( 10 );
78 monitor.setVerbose( 1 );
79 monitor.setStage(
"Jacobi stage:" );
80 solver.setSolverMonitor( monitor );
81 solver.setConvergenceResidue( 1.0e-6 );
83 monitor.stopMainLoop();
88main(
int argc,
char* argv[] )
91 iterativeLinearSolverExample< TNL::Devices::Sequential >();
95 iterativeLinearSolverExample< TNL::Devices::Cuda >();
Iterative solver of linear systems based on the Jacobi method.
Definition Jacobi.h:21
A RAII wrapper for launching the SolverMonitor's main loop in a separate thread.
Definition SolverMonitor.h:133
First, we set up the same linear system as in the previous example, we create an instance of the Jacobi solver and we pass the matrix of the linear system to the solver. Then, we set the relaxation parameter \( \omega \) of the Jacobi solver to 0.0005. The reason is to artificially slow down the convergence, because we want to see some iterations in this example. Next, we create an instance of the solver monitor and a special thread for the monitor (an instance of the TNL::Solvers::SolverMonitorThread class). We use the following methods to configure the solver monitor:
Next, we call TNL::Solvers::IterativeSolver::setSolverMonitor to connect the solver with the monitor and we set the convergence criterion based on the relative residue. Finally, we start the solver using the TNL::Solvers::Linear::Jacobi::solve method and when the solver finishes, we stop the monitor using TNL::Solvers::SolverMonitor::stopMainLoop.
The result looks as follows:
Solving linear system on host:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Jacobi stage: ITER: 15987 RES: 0.061998
Jacobi stage: ITER: 38391 RES: 0.0019854
Jacobi stage: ITER: 54651 RES: 0.00016337
Jacobi stage: ITER: 75287 RES: 6.8639e-06
Vector x = [ 0.999999, 0.999999, 0.999998, 0.999999, 0.999999 ]
Solving linear system on CUDA device:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Jacobi stage: ITER: 4481 RES: 0.36909
Jacobi stage: ITER: 9113 RES: 0.17828
Jacobi stage: ITER: 13487 RES: 0.091025
Jacobi stage: ITER: 17889 RES: 0.046277
Jacobi stage: ITER: 20843 RES: 0.029406
Jacobi stage: ITER: 22867 RES: 0.021549
Jacobi stage: ITER: 27019 RES: 0.011388
Jacobi stage: ITER: 30363 RES: 0.0068136
Jacobi stage: ITER: 32649 RES: 0.0047945
Jacobi stage: ITER: 37107 RES: 0.0024182
Jacobi stage: ITER: 41563 RES: 0.0012197
Jacobi stage: ITER: 45969 RES: 0.00061971
Jacobi stage: ITER: 50447 RES: 0.0003116
Jacobi stage: ITER: 54871 RES: 0.00015794
Jacobi stage: ITER: 55735 RES: 0.00013831
Jacobi stage: ITER: 57135 RES: 0.00011155
Jacobi stage: ITER: 59075 RES: 8.2803e-05
Jacobi stage: ITER: 60795 RES: 6.3578e-05
Jacobi stage: ITER: 61291 RES: 5.8914e-05
Jacobi stage: ITER: 63599 RES: 4.1329e-05
Jacobi stage: ITER: 66387 RES: 2.6932e-05
Jacobi stage: ITER: 68423 RES: 1.9699e-05
Jacobi stage: ITER: 69113 RES: 1.7713e-05
Jacobi stage: ITER: 70263 RES: 1.4849e-05
Jacobi stage: ITER: 71015 RES: 1.323e-05
Jacobi stage: ITER: 71955 RES: 1.1451e-05
Jacobi stage: ITER: 73947 RES: 8.4325e-06
Jacobi stage: ITER: 74871 RES: 7.3168e-06
Jacobi stage: ITER: 75747 RES: 6.3956e-06
Jacobi stage: ITER: 76719 RES: 5.5086e-06
Jacobi stage: ITER: 77715 RES: 4.7272e-06
Jacobi stage: ITER: 78611 RES: 4.1194e-06
Jacobi stage: ITER: 80419 RES: 3.1205e-06
Jacobi stage: ITER: 82299 RES: 2.3378e-06
Jacobi stage: ITER: 83003 RES: 2.0982e-06
Jacobi stage: ITER: 84197 RES: 1.7461e-06
Jacobi stage: ITER: 85135 RES: 1.5123e-06
Jacobi stage: ITER: 85887 RES: 1.3473e-06
Jacobi stage: ITER: 86951 RES: 1.1441e-06
Vector x = [ 0.999999, 0.999999, 0.999998, 0.999999, 0.999999 ]
The monitoring of the solver can be improved by time elapsed since the beginning of the computation as demonstrated in the following example:
6#include <TNL/Matrices/SparseMatrix.h>
7#include <TNL/Devices/Sequential.h>
8#include <TNL/Devices/Cuda.h>
9#include <TNL/Solvers/Linear/Jacobi.h>
11template<
typename Device >
13iterativeLinearSolverExample()
27 auto matrix_ptr = std::make_shared< MatrixType >();
28 matrix_ptr->setDimensions( size, size );
29 matrix_ptr->setRowCapacities( Vector( { 2, 3, 3, 3, 2 } ) );
33 const int rowIdx = row.getRowIndex();
35 row.setElement( 0, rowIdx, 2.5 );
36 row.setElement( 1, rowIdx + 1, -1 );
38 else if( rowIdx == size - 1 ) {
39 row.setElement( 0, rowIdx - 1, -1.0 );
40 row.setElement( 1, rowIdx, 2.5 );
43 row.setElement( 0, rowIdx - 1, -1.0 );
44 row.setElement( 1, rowIdx, 2.5 );
45 row.setElement( 2, rowIdx + 1, -1.0 );
52 matrix_ptr->forAllRows( f );
58 Vector x( size, 1.0 );
60 matrix_ptr->vectorProduct( x, b );
70 solver.setOmega( 0.0005 );
76 IterativeSolverMonitorType monitor;
78 monitor.setRefreshRate( 10 );
79 monitor.setVerbose( 1 );
80 monitor.setStage(
"Jacobi stage:" );
82 monitor.setTimer( timer );
84 solver.setSolverMonitor( monitor );
85 solver.setConvergenceResidue( 1.0e-6 );
87 monitor.stopMainLoop();
92main(
int argc,
char* argv[] )
95 iterativeLinearSolverExample< TNL::Devices::Sequential >();
99 iterativeLinearSolverExample< TNL::Devices::Cuda >();
Class for real time, CPU time and CPU cycles measuring.
Definition Timer.h:25
void start()
Starts timer.
Definition Timer.hpp:42
The only changes are around the lines where we create an instance of TNL::Timer, connect it with the monitor using TNL::Solvers::SolverMonitor::setTimer and start the timer with TNL::Timer::start.
The result looks as follows:
Solving linear system on host:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
ELA:0.001821
ELA: 0.10194 Jacobi stage: ITER: 10105 RES: 0.15303
ELA: 0.20204 Jacobi stage: ITER: 20607 RES: 0.030473
ELA: 0.30215 Jacobi stage: ITER: 32975 RES: 0.0045618
ELA: 0.40225 Jacobi stage: ITER: 53981 RES: 0.00018102
ELA: 0.50235 Jacobi stage: ITER: 75075 RES: 7.0911e-06
Vector x = [ 0.999999, 0.999999, 0.999998, 0.999999, 0.999999 ]
Solving linear system on CUDA device:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
ELA: 0.01128
ELA: 0.1114 Jacobi stage: ITER: 2675 RES: 0.50774
ELA: 0.2115 Jacobi stage: ITER: 4419 RES: 0.37302
ELA: 0.31161 Jacobi stage: ITER: 6645 RES: 0.26126
ELA: 0.41172 Jacobi stage: ITER: 7509 RES: 0.2284
ELA: 0.51182 Jacobi stage: ITER: 8989 RES: 0.18171
ELA: 0.61192 Jacobi stage: ITER: 10035 RES: 0.15473
ELA: 0.71202 Jacobi stage: ITER: 10455 RES: 0.14505
ELA: 0.81213 Jacobi stage: ITER: 11223 RES: 0.1289
ELA: 0.91223 Jacobi stage: ITER: 12875 RES: 0.099998
ELA: 1.0123 Jacobi stage: ITER: 14695 RES: 0.075608
ELA: 1.1124 Jacobi stage: ITER: 15723 RES: 0.064564
ELA: 1.2125 Jacobi stage: ITER: 16639 RES: 0.056089
ELA: 1.3126 Jacobi stage: ITER: 17433 RES: 0.049634
ELA: 1.4127 Jacobi stage: ITER: 18371 RES: 0.042987
ELA: 1.5128 Jacobi stage: ITER: 19617 RES: 0.035489
ELA: 1.6129 Jacobi stage: ITER: 20777 RES: 0.029697
ELA: 1.713 Jacobi stage: ITER: 21827 RES: 0.025281
ELA: 1.8131 Jacobi stage: ITER: 23019 RES: 0.021051
ELA: 1.9132 Jacobi stage: ITER: 23851 RES: 0.018526
ELA: 2.0133 Jacobi stage: ITER: 26261 RES: 0.01279
ELA: 2.1134 Jacobi stage: ITER: 27637 RES: 0.010354
ELA: 2.2135 Jacobi stage: ITER: 28595 RES: 0.0089395
ELA: 2.3136 Jacobi stage: ITER: 30341 RES: 0.0068345
ELA: 2.4137 Jacobi stage: ITER: 31239 RES: 0.0059558
ELA: 2.5138 Jacobi stage: ITER: 32177 RES: 0.005155
ELA: 2.6155 Jacobi stage: ITER: 35009 RES: 0.0033367
ELA: 2.7156 Jacobi stage: ITER: 39851 RES: 0.0015865
ELA: 2.8157 Jacobi stage: ITER: 45127 RES: 0.00070549
ELA: 2.9158 Jacobi stage: ITER: 50559 RES: 0.00030629
ELA: 3.0159 Jacobi stage: ITER: 54849 RES: 0.00015842
ELA: 3.116 Jacobi stage: ITER: 59831 RES: 7.3725e-05
ELA: 3.2161 Jacobi stage: ITER: 64083 RES: 3.8368e-05
ELA: 3.3162 Jacobi stage: ITER: 68629 RES: 1.908e-05
ELA: 3.4163 Jacobi stage: ITER: 72835 RES: 1.0003e-05
ELA: 3.5164 Jacobi stage: ITER: 77689 RES: 4.7446e-06
ELA: 3.6222 Jacobi stage: ITER: 82715 RES: 2.1931e-06
ELA:Vector x = [ 3.7223 Jacobi stage: ITER:0.999999 , 87829 RES: 9.9949e-07
0.999999, 0.999998, 0.999999, 0.999999 ]
Setup with preconditioner
Preconditioners of iterative solvers can significantly improve the performance of the solver. In the case of the linear systems, they are used mainly with the Krylov subspace methods. Preconditioners cannot be used with the starionary methods (TNL::Solvers::Linear::Jacobi and TNL::Solvers::Linear::SOR). The following example shows how to setup an iterative solver of linear systems with preconditioning.
3#include <TNL/Matrices/SparseMatrix.h>
4#include <TNL/Devices/Host.h>
5#include <TNL/Devices/Cuda.h>
6#include <TNL/Solvers/Linear/TFQMR.h>
7#include <TNL/Solvers/Linear/Preconditioners/Diagonal.h>
9template<
typename Device >
11iterativeLinearSolverExample()
25 auto matrix_ptr = std::make_shared< MatrixType >();
26 matrix_ptr->setDimensions( size, size );
27 matrix_ptr->setRowCapacities( Vector( { 2, 3, 3, 3, 2 } ) );
31 const int rowIdx = row.getRowIndex();
33 row.setElement( 0, rowIdx, 2.5 );
34 row.setElement( 1, rowIdx + 1, -1 );
36 else if( rowIdx == size - 1 ) {
37 row.setElement( 0, rowIdx - 1, -1.0 );
38 row.setElement( 1, rowIdx, 2.5 );
41 row.setElement( 0, rowIdx - 1, -1.0 );
42 row.setElement( 1, rowIdx, 2.5 );
43 row.setElement( 2, rowIdx + 1, -1.0 );
50 matrix_ptr->forAllRows( f );
56 Vector x( size, 1.0 );
58 matrix_ptr->vectorProduct( x, b );
67 auto preconditioner_ptr = std::make_shared< Preconditioner >();
68 preconditioner_ptr->update( matrix_ptr );
70 solver.setMatrix( matrix_ptr );
71 solver.setPreconditioner( preconditioner_ptr );
72 solver.setConvergenceResidue( 1.0e-6 );
78main(
int argc,
char* argv[] )
81 iterativeLinearSolverExample< TNL::Devices::Sequential >();
85 iterativeLinearSolverExample< TNL::Devices::Cuda >();
Diagonal (Jacobi) preconditioner for iterative solvers of linear systems.
Definition Diagonal.h:21
In this example, we solve the same problem as in all other examples in this section. The only differences concerning the preconditioner happen in the solver setup. Similarly to the matrix of the linear system, the preconditioner needs to be passed to the solver as a std::shared_ptr. When the preconditioner object is created, we have to initialize it using the update method, which has to be called everytime the matrix of the linear system changes. This is important, for example, when solving time-dependent PDEs, but it does not happen in this example. Finally, we need to connect the solver with the preconditioner using the setPreconditioner method.
The result looks as follows:
Solving linear system on host:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
Solving linear system on CUDA device:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
Choosing the solver and preconditioner type at runtime
When developing a numerical solver, one often has to search for a combination of various methods and algorithms that fit given requirements the best. To make this easier, TNL provides the functions TNL::Solvers::getLinearSolver and TNL::Solvers::getPreconditioner for selecting the linear solver and preconditioner at runtime. The following example shows how to use these functions:
3#include <TNL/Matrices/SparseMatrix.h>
4#include <TNL/Devices/Host.h>
5#include <TNL/Devices/Cuda.h>
6#include <TNL/Solvers/LinearSolverTypeResolver.h>
8template<
typename Device >
10iterativeLinearSolverExample()
24 auto matrix_ptr = std::make_shared< MatrixType >();
25 matrix_ptr->setDimensions( size, size );
26 matrix_ptr->setRowCapacities( Vector( { 2, 3, 3, 3, 2 } ) );
30 const int rowIdx = row.getRowIndex();
32 row.setElement( 0, rowIdx, 2.5 );
33 row.setElement( 1, rowIdx + 1, -1 );
35 else if( rowIdx == size - 1 ) {
36 row.setElement( 0, rowIdx - 1, -1.0 );
37 row.setElement( 1, rowIdx, 2.5 );
40 row.setElement( 0, rowIdx - 1, -1.0 );
41 row.setElement( 1, rowIdx, 2.5 );
42 row.setElement( 2, rowIdx + 1, -1.0 );
49 matrix_ptr->forAllRows( f );
55 Vector x( size, 1.0 );
57 matrix_ptr->vectorProduct( x, b );
64 auto solver_ptr = TNL::Solvers::getLinearSolver< MatrixType >(
"tfqmr" );
65 auto preconditioner_ptr = TNL::Solvers::getPreconditioner< MatrixType >(
"diagonal" );
66 preconditioner_ptr->update( matrix_ptr );
67 solver_ptr->setMatrix( matrix_ptr );
68 solver_ptr->setPreconditioner( preconditioner_ptr );
69 solver_ptr->setConvergenceResidue( 1.0e-6 );
70 solver_ptr->solve( b, x );
75main(
int argc,
char* argv[] )
78 iterativeLinearSolverExample< TNL::Devices::Sequential >();
82 iterativeLinearSolverExample< TNL::Devices::Cuda >();
We still stay with the same problem and the only changes are in the solver setup. We first use TNL::Solvers::getLinearSolver to get a shared pointer holding the solver and then TNL::Solvers::getPreconditioner to get a shared pointer holding the preconditioner. The rest of the code is the same as in the previous examples with the only difference that we work with the pointer solver_ptr instead of the direct instance solver of the solver type.
The result looks as follows:
Solving linear system on host:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
Solving linear system on CUDA device:
Row: 0 -> 0:2.5 1:-1
Row: 1 -> 0:-1 1:2.5 2:-1
Row: 2 -> 1:-1 2:2.5 3:-1
Row: 3 -> 2:-1 3:2.5 4:-1
Row: 4 -> 3:-1 4:2.5
Vector b = [ 1.5, 0.5, 0.5, 0.5, 1.5 ]
Vector x = [ 1, 1, 1, 1, 1 ]
