public class SymmLQ extends PreconditionedIterativeLinearSolver
Implementation of the SYMMLQ iterative linear solver proposed by Paige and Saunders (1975). This implementation is largely based on the FORTRAN code by Pr. Michael A. Saunders, available here.
SYMMLQ is designed to solve the system of linear equations A · x = b where A is an n × n self-adjoint
linear operator (defined as a RealLinearOperator), and b is a given vector. The operator A is not required to
be positive definite. If A is known to be definite, the method of conjugate gradients might be preferred, since it
will require about the same number of iterations as SYMMLQ but slightly less work per iteration.
SYMMLQ is designed to solve the system (A - shift · I) · x = b, where shift is a specified scalar value. If shift and b are suitably chosen, the computed vector x may approximate an (unnormalized) eigenvector of A, as in the methods of inverse iteration and/or Rayleigh-quotient iteration. Again, the linear operator (A - shift · I) need not be positive definite (but must be self-adjoint). The work per iteration is very slightly less if shift = 0.
Preconditioning may reduce the number of iterations required. The solver may be provided with a positive definite preconditioner M = PT · P that is known to approximate (A - shift · I)-1 in some sense, where matrix-vector products of the form M · y = x can be computed efficiently. Then SYMMLQ will implicitly solve the system of equations P · (A - shift · I) · PT · xhat = P · b, i.e. Ahat · xhat = bhat, where Ahat = P · (A - shift · I) · PT, bhat = P · b, and return the solution x = PT · xhat. The associated residual is rhat = bhat - Ahat · xhat = P · [b - (A - shift · I) · x] = P · r.
In the case of preconditioning, the IterativeLinearSolverEvents that this solver fires are such that
IterativeLinearSolverEvent.getNormOfResidual() returns the norm of the preconditioned, updated
residual, ||P · r||, not the norm of the true residual ||r||.
A default stopping criterion is implemented. The iterations stop when || rhat || ≤ δ || Ahat || || xhat ||, where xhat is the current estimate of the solution of the transformed system, rhat the current estimate of the corresponding residual, and δ a user-specified tolerance.
In the present context, an iteration should be understood as one evaluation of the matrix-vector product A · x. The initialization phase therefore counts as one iteration. If the user requires checks on the symmetry of A, this entails one further matrix-vector product in the initial phase. This further product is not accounted for in the iteration count. In other words, the number of iterations required to reach convergence will be identical, whether checks have been required or not.
The present definition of the iteration count differs from that adopted in the original FOTRAN code, where the initialization phase was not taken into account.
The x parameter in
solve(RealLinearOperator, RealVector, RealVector),solve(RealLinearOperator, RealLinearOperator, RealVector, RealVector) ,solveInPlace(RealLinearOperator, RealVector, RealVector),solveInPlace(RealLinearOperator, RealLinearOperator, RealVector, RealVector),solveInPlace(RealLinearOperator, RealLinearOperator, RealVector, RealVector, boolean, double),
Besides standard DimensionMismatchException, this class might throw NonSelfAdjointOperatorException
if the linear operator or the preconditioner are not symmetric. In this case, the ExceptionContext provides
more information
"operator" points to the offending linear operator, say L,"vector1" points to the first offending vector, say x,
"vector2" points to the second offending vector, say y, such that xT · L · y
≠ yT · L · x (within a certain accuracy).
NonPositiveDefiniteOperatorException might also be thrown in case the preconditioner is not positive
definite. The relevant keys to the ExceptionContext are
"operator", which points to the offending linear operator, say L,"vector", which points to the offending vector, say x, such that xT · L · x
< 0.| Constructor and Description |
|---|
SymmLQ(int maxIterations,
double deltaIn,
boolean checkIn)
Creates a new instance of this class, with default
stopping criterion.
|
SymmLQ(IterationManager manager,
double deltaIn,
boolean checkIn)
Creates a new instance of this class, with default
stopping criterion and custom iteration manager.
|
| Modifier and Type | Method and Description |
|---|---|
boolean |
getCheck()
Returns
true if symmetry of the matrix, and symmetry as well as
positive definiteness of the preconditioner should be checked. |
RealVector |
solve(RealLinearOperator a,
RealLinearOperator m,
RealVector b)
Returns an estimate of the solution to the linear system A · x =
b.
|
RealVector |
solve(RealLinearOperator a,
RealLinearOperator m,
RealVector b,
boolean goodb,
double shift)
Returns an estimate of the solution to the linear system (A - shift
· I) · x = b.
|
RealVector |
solve(RealLinearOperator a,
RealLinearOperator m,
RealVector b,
RealVector x)
Returns an estimate of the solution to the linear system A · x =
b.
|
RealVector |
solve(RealLinearOperator a,
RealVector b)
Returns an estimate of the solution to the linear system A · x =
b.
|
RealVector |
solve(RealLinearOperator a,
RealVector b,
boolean goodb,
double shift)
Returns the solution to the system (A - shift · I) · x = b.
|
RealVector |
solve(RealLinearOperator a,
RealVector b,
RealVector x)
Returns an estimate of the solution to the linear system A · x =
b.
|
RealVector |
solveInPlace(RealLinearOperator a,
RealLinearOperator m,
RealVector b,
RealVector x)
Returns an estimate of the solution to the linear system A · x =
b.
|
RealVector |
solveInPlace(RealLinearOperator a,
RealLinearOperator m,
RealVector b,
RealVector x,
boolean goodb,
double shift)
Returns an estimate of the solution to the linear system (A - shift
· I) · x = b.
|
RealVector |
solveInPlace(RealLinearOperator a,
RealVector b,
RealVector x)
Returns an estimate of the solution to the linear system A · x =
b.
|
checkParameterscheckParameters, getIterationManagerpublic SymmLQ(int maxIterations,
double deltaIn,
boolean checkIn)
check to true entails an extra matrix-vector product in
the initial phase.maxIterations - the maximum number of iterationsdeltaIn - the δ parameter for the default stopping criterioncheckIn - true if self-adjointedness of both matrix and
preconditioner should be checkedpublic SymmLQ(IterationManager manager, double deltaIn, boolean checkIn)
check to true entails an
extra matrix-vector product in
the initial phase.manager - the custom iteration managerdeltaIn - the δ parameter for the default stopping criterioncheckIn - true if self-adjointedness of both matrix and
preconditioner should be checkedpublic final boolean getCheck()
true if symmetry of the matrix, and symmetry as well as
positive definiteness of the preconditioner should be checked.true if the tests are to be performedpublic RealVector solve(RealLinearOperator a, RealLinearOperator m, RealVector b)
solve in class PreconditionedIterativeLinearSolvera - the linear operator A of the systemm - the preconditioner, M (can be null)b - the right-hand side vectorNonSelfAdjointOperatorException - if getCheck() is true, and a or m is not self-adjointNonPositiveDefiniteOperatorException - if m is not
positive definiteIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solve(RealLinearOperator a, RealLinearOperator m, RealVector b, boolean goodb, double shift)
If the solution x is expected to contain a large multiple of b (as in Rayleigh-quotient iteration), then
better precision may be achieved with goodb set to true; this however requires an extra call to
the preconditioner.
shift should be zero if the system A · x = b is to be solved. Otherwise, it could be an
approximation to an eigenvalue of A, such as the Rayleigh quotient bT · A · b /
(bT · b) corresponding to the vector b. If b is sufficiently like an eigenvector corresponding
to an eigenvalue near shift, then the computed x may have very large components. When normalized, x may be closer
to an eigenvector than b.
a - the linear operator A of the systemm - the preconditioner, M (can be null)b - the right-hand side vectorgoodb - usually false, except if x is expected to
contain a large multiple of bshift - the amount to be subtracted to all diagonal elements of Ax (shallow copy)NullArgumentException - if one of the parameters is nullNonSquareOperatorException - if a or m is not squareDimensionMismatchException - if m or b have dimensions
inconsistent with aMaxCountExceededException - at exhaustion of the iteration count,
unless a custom callback has been set at construction of the IterationManagerNonSelfAdjointOperatorException - if getCheck() is true, and a or m is not self-adjointNonPositiveDefiniteOperatorException - if m is not
positive definiteIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solve(RealLinearOperator a, RealLinearOperator m, RealVector b, RealVector x)
solve in class PreconditionedIterativeLinearSolverx - not meaningful in this implementation; should not be considered
as an initial guess (more)a - the linear operator A of the systemm - the preconditioner, M (can be null)b - the right-hand side vectorNonSelfAdjointOperatorException - if getCheck() is true, and a or m is not self-adjointNonPositiveDefiniteOperatorException - if m is not positive
definiteIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solve(RealLinearOperator a, RealVector b)
solve in class PreconditionedIterativeLinearSolvera - the linear operator A of the systemb - the right-hand side vectorNonSelfAdjointOperatorException - if getCheck() is true, and a is not self-adjointIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solve(RealLinearOperator a, RealVector b, boolean goodb, double shift)
If the solution x is expected to contain a large multiple of b (as in Rayleigh-quotient iteration), then
better precision may be achieved with goodb set to true.
shift should be zero if the system A · x = b is to be solved. Otherwise, it could be an
approximation to an eigenvalue of A, such as the Rayleigh quotient bT · A · b /
(bT · b) corresponding to the vector b. If b is sufficiently like an eigenvector corresponding
to an eigenvalue near shift, then the computed x may have very large components. When normalized, x may be closer
to an eigenvector than b.
a - the linear operator A of the systemb - the right-hand side vectorgoodb - usually false, except if x is expected to
contain a large multiple of bshift - the amount to be subtracted to all diagonal elements of AxNullArgumentException - if one of the parameters is nullNonSquareOperatorException - if a is not squareDimensionMismatchException - if b has dimensions
inconsistent with aMaxCountExceededException - at exhaustion of the iteration count,
unless a custom callback has been set at construction of the IterationManagerNonSelfAdjointOperatorException - if getCheck() is true, and a is not self-adjointIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solve(RealLinearOperator a, RealVector b, RealVector x)
solve in class PreconditionedIterativeLinearSolverx - not meaningful in this implementation; should not be considered
as an initial guess (more)a - the linear operator A of the systemb - the right-hand side vectorNonSelfAdjointOperatorException - if getCheck() is true, and a is not self-adjointIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solveInPlace(RealLinearOperator a, RealLinearOperator m, RealVector b, RealVector x)
solveInPlace in class PreconditionedIterativeLinearSolverx - the vector to be updated with the solution; x should
not be considered as an initial guess (more)a - the linear operator A of the systemm - the preconditioner, M (can be null)b - the right-hand side vectorx0 (shallow copy) updated with the
solutionNonSelfAdjointOperatorException - if getCheck() is true, and a or m is not self-adjointNonPositiveDefiniteOperatorException - if m is not
positive definiteIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solveInPlace(RealLinearOperator a, RealLinearOperator m, RealVector b, RealVector x, boolean goodb, double shift)
If the solution x is expected to contain a large multiple of b (as in Rayleigh-quotient iteration), then
better precision may be achieved with goodb set to true; this however requires an extra call to
the preconditioner.
shift should be zero if the system A · x = b is to be solved. Otherwise, it could be an
approximation to an eigenvalue of A, such as the Rayleigh quotient bT · A · b /
(bT · b) corresponding to the vector b. If b is sufficiently like an eigenvector corresponding
to an eigenvalue near shift, then the computed x may have very large components. When normalized, x may be closer
to an eigenvector than b.
a - the linear operator A of the systemm - the preconditioner, M (can be null)b - the right-hand side vectorx - the vector to be updated with the solution; x should
not be considered as an initial guess (more)goodb - usually false, except if x is expected to
contain a large multiple of bshift - the amount to be subtracted to all diagonal elements of Ax (shallow copy).NullArgumentException - if one of the parameters is nullNonSquareOperatorException - if a or m is not squareDimensionMismatchException - if m, b or x have dimensions inconsistent with a.MaxCountExceededException - at exhaustion of the iteration count,
unless a custom callback has been set at construction of the IterationManagerNonSelfAdjointOperatorException - if getCheck() is true, and a or m is not self-adjointNonPositiveDefiniteOperatorException - if m is not positive
definiteIllConditionedOperatorException - if a is ill-conditionedpublic RealVector solveInPlace(RealLinearOperator a, RealVector b, RealVector x)
solveInPlace in class PreconditionedIterativeLinearSolverx - the vector to be updated with the solution; x should
not be considered as an initial guess (more)a - the linear operator A of the systemb - the right-hand side vectorx0 (shallow copy) updated with the
solutionNonSelfAdjointOperatorException - if getCheck() is true, and a is not self-adjointIllConditionedOperatorException - if a is ill-conditionedCopyright © 2019 CNES. All Rights Reserved.