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 * contributor license agreements.  See the NOTICE file distributed with
 * this work for additional information regarding copyright ownership.
 * The ASF licenses this file to You under the Apache License, Version 2.0
 * (the "License"); you may not use this file except in compliance with
 * the License.  You may obtain a copy of the License at
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/*
 * This is not the original file distributed by the Apache Software Foundation
 * It has been modified by the Hipparchus project
 */
package org.hipparchus.linear;

import org.hipparchus.exception.LocalizedCoreFormats;
import org.hipparchus.exception.MathIllegalArgumentException;
import org.hipparchus.exception.MathIllegalStateException;
import org.hipparchus.exception.NullArgumentException;
import org.hipparchus.util.FastMath;
import org.hipparchus.util.IterationManager;
import org.hipparchus.util.MathUtils;

/**
 * 

* 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 * {@link 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

*

* 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 {@link IterativeLinearSolverEvent}s that * this solver fires are such that * {@link IterativeLinearSolverEvent#getNormOfResidual()} returns the norm of * the preconditioned, updated residual, ||P · r||, not the norm * of the true residual ||r||. *

*

Default stopping criterion

*

* 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. *

*

Iteration count

*

* 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. *

*

Initial guess of the solution

*

* The {@code x} parameter in *

    *
  • {@link #solve(RealLinearOperator, RealVector, RealVector)},
  • *
  • {@link #solve(RealLinearOperator, RealLinearOperator, RealVector, RealVector)}},
  • *
  • {@link #solveInPlace(RealLinearOperator, RealVector, RealVector)},
  • *
  • {@link #solveInPlace(RealLinearOperator, RealLinearOperator, RealVector, RealVector)},
  • *
  • {@link #solveInPlace(RealLinearOperator, RealLinearOperator, RealVector, RealVector, boolean, double)},
  • *
* should not be considered as an initial guess, as it is set to zero in the * initial phase. If x0 is known to be a good approximation to x, one * should compute r0 = b - A · x, solve A · dx = r0, * and set x = x0 + dx. *

*

Exception context

*

* Besides standard {@link MathIllegalArgumentException}, this class might throw * {@link MathIllegalArgumentException} if the linear operator or the * preconditioner are not symmetric. *

    *
  • key {@code "operator"} points to the offending linear operator, say L,
  • *
  • key {@code "vector1"} points to the first offending vector, say x, *
  • key {@code "vector2"} points to the second offending vector, say y, such * that xT · L · y ≠ yT · L * · x (within a certain accuracy).
  • *
*

*

* {@link MathIllegalArgumentException} might also be thrown in case the * preconditioner is not positive definite. *

*

References

*
*
Paige and Saunders (1975)
*
C. C. Paige and M. A. Saunders, * Solution of Sparse Indefinite Systems of Linear Equations, SIAM * Journal on Numerical Analysis 12(4): 617-629, 1975
*
* */ public class SymmLQ extends PreconditionedIterativeLinearSolver { /* * IMPLEMENTATION NOTES * -------------------- * The implementation follows as closely as possible the notations of Paige * and Saunders (1975). Attention must be paid to the fact that some * quantities which are relevant to iteration k can only be computed in * iteration (k+1). Therefore, minute attention must be paid to the index of * each state variable of this algorithm. * * 1. Preconditioning * --------------- * The Lanczos iterations associated with Ahat and bhat read * beta[1] = ||P * b|| * v[1] = P * b / beta[1] * beta[k+1] * v[k+1] = Ahat * v[k] - alpha[k] * v[k] - beta[k] * v[k-1] * = P * (A - shift * I) * P' * v[k] - alpha[k] * v[k] * - beta[k] * v[k-1] * Multiplying both sides by P', we get * beta[k+1] * (P' * v)[k+1] = M * (A - shift * I) * (P' * v)[k] * - alpha[k] * (P' * v)[k] * - beta[k] * (P' * v[k-1]), * and * alpha[k+1] = v[k+1]' * Ahat * v[k+1] * = v[k+1]' * P * (A - shift * I) * P' * v[k+1] * = (P' * v)[k+1]' * (A - shift * I) * (P' * v)[k+1]. * * In other words, the Lanczos iterations are unchanged, except for the fact * that we really compute (P' * v) instead of v. It can easily be checked * that all other formulas are unchanged. It must be noted that P is never * explicitly used, only matrix-vector products involving are invoked. * * 2. Accounting for the shift parameter * ---------------------------------- * Is trivial: each time A.operate(x) is invoked, one must subtract shift * x * to the result. * * 3. Accounting for the goodb flag * ----------------------------- * When goodb is set to true, the component of xL along b is computed * separately. From Paige and Saunders (1975), equation (5.9), we have * wbar[k+1] = s[k] * wbar[k] - c[k] * v[k+1], * wbar[1] = v[1]. * Introducing wbar2[k] = wbar[k] - s[1] * ... * s[k-1] * v[1], it can * easily be verified by induction that wbar2 follows the same recursive * relation * wbar2[k+1] = s[k] * wbar2[k] - c[k] * v[k+1], * wbar2[1] = 0, * and we then have * w[k] = c[k] * wbar2[k] + s[k] * v[k+1] * + s[1] * ... * s[k-1] * c[k] * v[1]. * Introducing w2[k] = w[k] - s[1] * ... * s[k-1] * c[k] * v[1], we find, * from (5.10) * xL[k] = zeta[1] * w[1] + ... + zeta[k] * w[k] * = zeta[1] * w2[1] + ... + zeta[k] * w2[k] * + (s[1] * c[2] * zeta[2] + ... * + s[1] * ... * s[k-1] * c[k] * zeta[k]) * v[1] * = xL2[k] + bstep[k] * v[1], * where xL2[k] is defined by * xL2[0] = 0, * xL2[k+1] = xL2[k] + zeta[k+1] * w2[k+1], * and bstep is defined by * bstep[1] = 0, * bstep[k] = bstep[k-1] + s[1] * ... * s[k-1] * c[k] * zeta[k]. * We also have, from (5.11) * xC[k] = xL[k-1] + zbar[k] * wbar[k] * = xL2[k-1] + zbar[k] * wbar2[k] * + (bstep[k-1] + s[1] * ... * s[k-1] * zbar[k]) * v[1]. */ /** *

* A simple container holding the non-final variables used in the * iterations. Making the current state of the solver visible from the * outside is necessary, because during the iterations, {@code x} does not * exactly hold the current estimate of the solution. Indeed, * {@code x} needs in general to be moved from the LQ point to the CG point. * Besides, additional upudates must be carried out in case {@code goodb} is * set to {@code true}. *

*

* In all subsequent comments, the description of the state variables refer * to their value after a call to {@link #update()}. In these comments, k is * the current number of evaluations of matrix-vector products. *

*/ private static class State { /** The cubic root of {@link #MACH_PREC}. */ static final double CBRT_MACH_PREC; /** The machine precision. */ static final double MACH_PREC; /** Reference to the linear operator. */ private final RealLinearOperator a; /** Reference to the right-hand side vector. */ private final RealVector b; /** {@code true} if symmetry of matrix and conditioner must be checked. */ private final boolean check; /** * The value of the custom tolerance δ for the default stopping * criterion. */ private final double delta; /** The value of beta[k+1]. */ private double beta; /** The value of beta[1]. */ private double beta1; /** The value of bstep[k-1]. */ private double bstep; /** The estimate of the norm of P * rC[k]. */ private double cgnorm; /** The value of dbar[k+1] = -beta[k+1] * c[k-1]. */ private double dbar; /** * The value of gamma[k] * zeta[k]. Was called {@code rhs1} in the * initial code. */ private double gammaZeta; /** The value of gbar[k]. */ private double gbar; /** The value of max(|alpha[1]|, gamma[1], ..., gamma[k-1]). */ private double gmax; /** The value of min(|alpha[1]|, gamma[1], ..., gamma[k-1]). */ private double gmin; /** Copy of the {@code goodb} parameter. */ private final boolean goodb; /** {@code true} if the default convergence criterion is verified. */ private boolean hasConverged; /** The estimate of the norm of P * rL[k-1]. */ private double lqnorm; /** Reference to the preconditioner, M. */ private final RealLinearOperator m; /** * The value of (-eps[k+1] * zeta[k-1]). Was called {@code rhs2} in the * initial code. */ private double minusEpsZeta; /** The value of M * b. */ private final RealVector mb; /** The value of beta[k]. */ private double oldb; /** The value of beta[k] * M^(-1) * P' * v[k]. */ private RealVector r1; /** The value of beta[k+1] * M^(-1) * P' * v[k+1]. */ private RealVector r2; /** * The value of the updated, preconditioned residual P * r. This value is * given by {@code min(}{@link #cgnorm}{@code , }{@link #lqnorm}{@code )}. */ private double rnorm; /** Copy of the {@code shift} parameter. */ private final double shift; /** The value of s[1] * ... * s[k-1]. */ private double snprod; /** * An estimate of the square of the norm of A * V[k], based on Paige and * Saunders (1975), equation (3.3). */ private double tnorm; /** * The value of P' * wbar[k] or P' * (wbar[k] - s[1] * ... * s[k-1] * * v[1]) if {@code goodb} is {@code true}. Was called {@code w} in the * initial code. */ private RealVector wbar; /** * A reference to the vector to be updated with the solution. Contains * the value of xL[k-1] if {@code goodb} is {@code false}, (xL[k-1] - * bstep[k-1] * v[1]) otherwise. */ private final RealVector xL; /** The value of beta[k+1] * P' * v[k+1]. */ private RealVector y; /** The value of zeta[1]^2 + ... + zeta[k-1]^2. */ private double ynorm2; /** The value of {@code b == 0} (exact floating-point equality). */ private boolean bIsNull; static { MACH_PREC = FastMath.ulp(1.); CBRT_MACH_PREC = FastMath.cbrt(MACH_PREC); } /** * Creates and inits to k = 1 a new instance of this class. * * @param a the linear operator A of the system * @param m the preconditioner, M (can be {@code null}) * @param b the right-hand side vector * @param goodb usually {@code false}, except if {@code x} is expected * to contain a large multiple of {@code b} * @param shift the amount to be subtracted to all diagonal elements of * A * @param delta the δ parameter for the default stopping criterion * @param check {@code true} if self-adjointedness of both matrix and * preconditioner should be checked */ State(final RealLinearOperator a, final RealLinearOperator m, final RealVector b, final boolean goodb, final double shift, final double delta, final boolean check) { this.a = a; this.m = m; this.b = b; this.xL = new ArrayRealVector(b.getDimension()); this.goodb = goodb; this.shift = shift; this.mb = m == null ? b : m.operate(b); this.hasConverged = false; this.check = check; this.delta = delta; } /** * Performs a symmetry check on the specified linear operator, and throws an * exception in case this check fails. Given a linear operator L, and a * vector x, this method checks that * x' · L · y = y' · L · x * (within a given accuracy), where y = L · x. * * @param l the linear operator L * @param x the candidate vector x * @param y the candidate vector y = L · x * @param z the vector z = L · y * @throws MathIllegalArgumentException when the test fails */ private static void checkSymmetry(final RealLinearOperator l, final RealVector x, final RealVector y, final RealVector z) throws MathIllegalArgumentException { final double s = y.dotProduct(y); final double t = x.dotProduct(z); final double epsa = (s + MACH_PREC) * CBRT_MACH_PREC; if (FastMath.abs(s - t) > epsa) { throw new MathIllegalArgumentException(LocalizedCoreFormats.NON_SELF_ADJOINT_OPERATOR); } } /** * Throws a new {@link MathIllegalArgumentException} with * appropriate context. * * @param l the offending linear operator * @param v the offending vector * @throws MathIllegalArgumentException in any circumstances */ private static void throwNPDLOException(final RealLinearOperator l, final RealVector v) throws MathIllegalArgumentException { throw new MathIllegalArgumentException(LocalizedCoreFormats.NON_POSITIVE_DEFINITE_OPERATOR); } /** * A clone of the BLAS {@code DAXPY} function, which carries out the * operation y ← a · x + y. This is for internal use only: no * dimension checks are provided. * * @param a the scalar by which {@code x} is to be multiplied * @param x the vector to be added to {@code y} * @param y the vector to be incremented */ private static void daxpy(final double a, final RealVector x, final RealVector y) { final int n = x.getDimension(); for (int i = 0; i < n; i++) { y.setEntry(i, a * x.getEntry(i) + y.getEntry(i)); } } /** * A BLAS-like function, for the operation z ← a · x + b * · y + z. This is for internal use only: no dimension checks are * provided. * * @param a the scalar by which {@code x} is to be multiplied * @param x the first vector to be added to {@code z} * @param b the scalar by which {@code y} is to be multiplied * @param y the second vector to be added to {@code z} * @param z the vector to be incremented */ private static void daxpbypz(final double a, final RealVector x, final double b, final RealVector y, final RealVector z) { final int n = z.getDimension(); for (int i = 0; i < n; i++) { final double zi; zi = a * x.getEntry(i) + b * y.getEntry(i) + z.getEntry(i); z.setEntry(i, zi); } } /** *

* Move to the CG point if it seems better. In this version of SYMMLQ, * the convergence tests involve only cgnorm, so we're unlikely to stop * at an LQ point, except if the iteration limit interferes. *

*

* Additional upudates are also carried out in case {@code goodb} is set * to {@code true}. *

* * @param x the vector to be updated with the refined value of xL */ void refineSolution(final RealVector x) { final int n = this.xL.getDimension(); if (lqnorm < cgnorm) { if (!goodb) { x.setSubVector(0, this.xL); } else { final double step = bstep / beta1; for (int i = 0; i < n; i++) { final double bi = mb.getEntry(i); final double xi = this.xL.getEntry(i); x.setEntry(i, xi + step * bi); } } } else { final double anorm = FastMath.sqrt(tnorm); final double diag = gbar == 0. ? anorm * MACH_PREC : gbar; final double zbar = gammaZeta / diag; final double step = (bstep + snprod * zbar) / beta1; // ynorm = FastMath.sqrt(ynorm2 + zbar * zbar); if (!goodb) { for (int i = 0; i < n; i++) { final double xi = this.xL.getEntry(i); final double wi = wbar.getEntry(i); x.setEntry(i, xi + zbar * wi); } } else { for (int i = 0; i < n; i++) { final double xi = this.xL.getEntry(i); final double wi = wbar.getEntry(i); final double bi = mb.getEntry(i); x.setEntry(i, xi + zbar * wi + step * bi); } } } } /** * Performs the initial phase of the SYMMLQ algorithm. On return, the * value of the state variables of {@code this} object correspond to k = * 1. */ void init() { this.xL.set(0.); /* * Set up y for the first Lanczos vector. y and beta1 will be zero * if b = 0. */ this.r1 = this.b.copy(); this.y = this.m == null ? this.b.copy() : this.m.operate(this.r1); if ((this.m != null) && this.check) { checkSymmetry(this.m, this.r1, this.y, this.m.operate(this.y)); } this.beta1 = this.r1.dotProduct(this.y); if (this.beta1 < 0.) { throwNPDLOException(this.m, this.y); } if (this.beta1 == 0.) { /* If b = 0 exactly, stop with x = 0. */ this.bIsNull = true; return; } this.bIsNull = false; this.beta1 = FastMath.sqrt(this.beta1); /* At this point * r1 = b, * y = M * b, * beta1 = beta[1]. */ final RealVector v = this.y.mapMultiply(1. / this.beta1); this.y = this.a.operate(v); if (this.check) { checkSymmetry(this.a, v, this.y, this.a.operate(this.y)); } /* * Set up y for the second Lanczos vector. y and beta will be zero * or very small if b is an eigenvector. */ daxpy(-this.shift, v, this.y); final double alpha = v.dotProduct(this.y); daxpy(-alpha / this.beta1, this.r1, this.y); /* * At this point * alpha = alpha[1] * y = beta[2] * M^(-1) * P' * v[2] */ /* Make sure r2 will be orthogonal to the first v. */ final double vty = v.dotProduct(this.y); final double vtv = v.dotProduct(v); daxpy(-vty / vtv, v, this.y); this.r2 = this.y.copy(); if (this.m != null) { this.y = this.m.operate(this.r2); } this.oldb = this.beta1; this.beta = this.r2.dotProduct(this.y); if (this.beta < 0.) { throwNPDLOException(this.m, this.y); } this.beta = FastMath.sqrt(this.beta); /* * At this point * oldb = beta[1] * beta = beta[2] * y = beta[2] * P' * v[2] * r2 = beta[2] * M^(-1) * P' * v[2] */ this.cgnorm = this.beta1; this.gbar = alpha; this.dbar = this.beta; this.gammaZeta = this.beta1; this.minusEpsZeta = 0.; this.bstep = 0.; this.snprod = 1.; this.tnorm = alpha * alpha + this.beta * this.beta; this.ynorm2 = 0.; this.gmax = FastMath.abs(alpha) + MACH_PREC; this.gmin = this.gmax; if (this.goodb) { this.wbar = new ArrayRealVector(this.a.getRowDimension()); this.wbar.set(0.); } else { this.wbar = v; } updateNorms(); } /** * Performs the next iteration of the algorithm. The iteration count * should be incremented prior to calling this method. On return, the * value of the state variables of {@code this} object correspond to the * current iteration count {@code k}. */ void update() { final RealVector v = y.mapMultiply(1. / beta); y = a.operate(v); daxpbypz(-shift, v, -beta / oldb, r1, y); final double alpha = v.dotProduct(y); /* * At this point * v = P' * v[k], * y = (A - shift * I) * P' * v[k] - beta[k] * M^(-1) * P' * v[k-1], * alpha = v'[k] * P * (A - shift * I) * P' * v[k] * - beta[k] * v[k]' * P * M^(-1) * P' * v[k-1] * = v'[k] * P * (A - shift * I) * P' * v[k] * - beta[k] * v[k]' * v[k-1] * = alpha[k]. */ daxpy(-alpha / beta, r2, y); /* * At this point * y = (A - shift * I) * P' * v[k] - alpha[k] * M^(-1) * P' * v[k] * - beta[k] * M^(-1) * P' * v[k-1] * = M^(-1) * P' * (P * (A - shift * I) * P' * v[k] -alpha[k] * v[k] * - beta[k] * v[k-1]) * = beta[k+1] * M^(-1) * P' * v[k+1], * from Paige and Saunders (1975), equation (3.2). * * WATCH-IT: the two following lines work only because y is no longer * updated up to the end of the present iteration, and is * reinitialized at the beginning of the next iteration. */ r1 = r2; r2 = y; if (m != null) { y = m.operate(r2); } oldb = beta; beta = r2.dotProduct(y); if (beta < 0.) { throwNPDLOException(m, y); } beta = FastMath.sqrt(beta); /* * At this point * r1 = beta[k] * M^(-1) * P' * v[k], * r2 = beta[k+1] * M^(-1) * P' * v[k+1], * y = beta[k+1] * P' * v[k+1], * oldb = beta[k], * beta = beta[k+1]. */ tnorm += alpha * alpha + oldb * oldb + beta * beta; /* * Compute the next plane rotation for Q. See Paige and Saunders * (1975), equation (5.6), with * gamma = gamma[k-1], * c = c[k-1], * s = s[k-1]. */ final double gamma = FastMath.sqrt(gbar * gbar + oldb * oldb); final double c = gbar / gamma; final double s = oldb / gamma; /* * The relations * gbar[k] = s[k-1] * (-c[k-2] * beta[k]) - c[k-1] * alpha[k] * = s[k-1] * dbar[k] - c[k-1] * alpha[k], * delta[k] = c[k-1] * dbar[k] + s[k-1] * alpha[k], * are not stated in Paige and Saunders (1975), but can be retrieved * by expanding the (k, k-1) and (k, k) coefficients of the matrix in * equation (5.5). */ final double deltak = c * dbar + s * alpha; gbar = s * dbar - c * alpha; final double eps = s * beta; dbar = -c * beta; final double zeta = gammaZeta / gamma; /* * At this point * gbar = gbar[k] * deltak = delta[k] * eps = eps[k+1] * dbar = dbar[k+1] * zeta = zeta[k-1] */ final double zetaC = zeta * c; final double zetaS = zeta * s; final int n = xL.getDimension(); for (int i = 0; i < n; i++) { final double xi = xL.getEntry(i); final double vi = v.getEntry(i); final double wi = wbar.getEntry(i); xL.setEntry(i, xi + wi * zetaC + vi * zetaS); wbar.setEntry(i, wi * s - vi * c); } /* * At this point * x = xL[k-1], * ptwbar = P' wbar[k], * see Paige and Saunders (1975), equations (5.9) and (5.10). */ bstep += snprod * c * zeta; snprod *= s; gmax = FastMath.max(gmax, gamma); gmin = FastMath.min(gmin, gamma); ynorm2 += zeta * zeta; gammaZeta = minusEpsZeta - deltak * zeta; minusEpsZeta = -eps * zeta; /* * At this point * snprod = s[1] * ... * s[k-1], * gmax = max(|alpha[1]|, gamma[1], ..., gamma[k-1]), * gmin = min(|alpha[1]|, gamma[1], ..., gamma[k-1]), * ynorm2 = zeta[1]^2 + ... + zeta[k-1]^2, * gammaZeta = gamma[k] * zeta[k], * minusEpsZeta = -eps[k+1] * zeta[k-1]. * The relation for gammaZeta can be retrieved from Paige and * Saunders (1975), equation (5.4a), last line of the vector * gbar[k] * zbar[k] = -eps[k] * zeta[k-2] - delta[k] * zeta[k-1]. */ updateNorms(); } /** * Computes the norms of the residuals, and checks for convergence. * Updates {@link #lqnorm} and {@link #cgnorm}. */ private void updateNorms() { final double anorm = FastMath.sqrt(tnorm); final double ynorm = FastMath.sqrt(ynorm2); final double epsa = anorm * MACH_PREC; final double epsx = anorm * ynorm * MACH_PREC; final double epsr = anorm * ynorm * delta; final double diag = gbar == 0. ? epsa : gbar; lqnorm = FastMath.sqrt(gammaZeta * gammaZeta + minusEpsZeta * minusEpsZeta); final double qrnorm = snprod * beta1; cgnorm = qrnorm * beta / FastMath.abs(diag); /* * Estimate cond(A). In this version we look at the diagonals of L * in the factorization of the tridiagonal matrix, T = L * Q. * Sometimes, T[k] can be misleadingly ill-conditioned when T[k+1] * is not, so we must be careful not to overestimate acond. */ final double acond; if (lqnorm <= cgnorm) { acond = gmax / gmin; } else { acond = gmax / FastMath.min(gmin, FastMath.abs(diag)); } if (acond * MACH_PREC >= 0.1) { throw new MathIllegalArgumentException(LocalizedCoreFormats.ILL_CONDITIONED_OPERATOR, acond); } if (beta1 <= epsx) { /* * x has converged to an eigenvector of A corresponding to the * eigenvalue shift. */ throw new MathIllegalArgumentException(LocalizedCoreFormats.SINGULAR_OPERATOR); } rnorm = FastMath.min(cgnorm, lqnorm); hasConverged = (cgnorm <= epsx) || (cgnorm <= epsr); } /** * Returns {@code true} if the default stopping criterion is fulfilled. * * @return {@code true} if convergence of the iterations has occurred */ boolean hasConverged() { return hasConverged; } /** * Returns {@code true} if the right-hand side vector is zero exactly. * * @return the boolean value of {@code b == 0} */ boolean bEqualsNullVector() { return bIsNull; } /** * Returns {@code true} if {@code beta} is essentially zero. This method * is used to check for early stop of the iterations. * * @return {@code true} if {@code beta < }{@link #MACH_PREC} */ boolean betaEqualsZero() { return beta < MACH_PREC; } /** * Returns the norm of the updated, preconditioned residual. * * @return the norm of the residual, ||P * r|| */ double getNormOfResidual() { return rnorm; } } /** {@code true} if symmetry of matrix and conditioner must be checked. */ private final boolean check; /** * The value of the custom tolerance δ for the default stopping * criterion. */ private final double delta; /** * Creates a new instance of this class, with default * stopping criterion. Note that setting {@code check} to {@code true} * entails an extra matrix-vector product in the initial phase. * * @param maxIterations the maximum number of iterations * @param delta the δ parameter for the default stopping criterion * @param check {@code true} if self-adjointedness of both matrix and * preconditioner should be checked */ public SymmLQ(final int maxIterations, final double delta, final boolean check) { super(maxIterations); this.delta = delta; this.check = check; } /** * Creates a new instance of this class, with default * stopping criterion and custom iteration manager. Note that setting * {@code check} to {@code true} entails an extra matrix-vector product in * the initial phase. * * @param manager the custom iteration manager * @param delta the δ parameter for the default stopping criterion * @param check {@code true} if self-adjointedness of both matrix and * preconditioner should be checked */ public SymmLQ(final IterationManager manager, final double delta, final boolean check) { super(manager); this.delta = delta; this.check = check; } /** * Returns {@code true} if symmetry of the matrix, and symmetry as well as * positive definiteness of the preconditioner should be checked. * * @return {@code true} if the tests are to be performed */ public final boolean getCheck() { return check; } /** * {@inheritDoc} * * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} or {@code m} is not self-adjoint * @throws MathIllegalArgumentException if {@code m} is not * positive definite * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solve(final RealLinearOperator a, final RealLinearOperator m, final RealVector b) throws MathIllegalArgumentException, NullArgumentException, MathIllegalStateException, MathIllegalArgumentException { MathUtils.checkNotNull(a); final RealVector x = new ArrayRealVector(a.getColumnDimension()); return solveInPlace(a, m, b, x, false, 0.); } /** * Returns an estimate of the solution to the linear system (A - shift * · I) · x = b. *

* If the solution x is expected to contain a large multiple of {@code b} * (as in Rayleigh-quotient iteration), then better precision may be * achieved with {@code goodb} set to {@code true}; this however requires an * extra call to the preconditioner. *

*

* {@code 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. *

* * @param a the linear operator A of the system * @param m the preconditioner, M (can be {@code null}) * @param b the right-hand side vector * @param goodb usually {@code false}, except if {@code x} is expected to * contain a large multiple of {@code b} * @param shift the amount to be subtracted to all diagonal elements of A * @return a reference to {@code x} (shallow copy) * @throws NullArgumentException if one of the parameters is {@code null} * @throws MathIllegalArgumentException if {@code a} or {@code m} is not square * @throws MathIllegalArgumentException if {@code m} or {@code b} have dimensions * inconsistent with {@code a} * @throws MathIllegalStateException at exhaustion of the iteration count, * unless a custom * {@link org.hipparchus.util.Incrementor.MaxCountExceededCallback callback} * has been set at construction of the {@link IterationManager} * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} or {@code m} is not self-adjoint * @throws MathIllegalArgumentException if {@code m} is not * positive definite * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ public RealVector solve(final RealLinearOperator a, final RealLinearOperator m, final RealVector b, final boolean goodb, final double shift) throws MathIllegalArgumentException, NullArgumentException, MathIllegalStateException { MathUtils.checkNotNull(a); final RealVector x = new ArrayRealVector(a.getColumnDimension()); return solveInPlace(a, m, b, x, goodb, shift); } /** * {@inheritDoc} * * @param x not meaningful in this implementation; should not be considered * as an initial guess (more) * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} or {@code m} is not self-adjoint * @throws MathIllegalArgumentException if {@code m} is not positive * definite * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solve(final RealLinearOperator a, final RealLinearOperator m, final RealVector b, final RealVector x) throws MathIllegalArgumentException, NullArgumentException, MathIllegalArgumentException, MathIllegalStateException { MathUtils.checkNotNull(x); return solveInPlace(a, m, b, x.copy(), false, 0.); } /** * {@inheritDoc} * * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} is not self-adjoint * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solve(final RealLinearOperator a, final RealVector b) throws MathIllegalArgumentException, NullArgumentException, MathIllegalArgumentException, MathIllegalStateException { MathUtils.checkNotNull(a); final RealVector x = new ArrayRealVector(a.getColumnDimension()); x.set(0.); return solveInPlace(a, null, b, x, false, 0.); } /** * Returns the solution to the system (A - shift · I) · x = b. *

* If the solution x is expected to contain a large multiple of {@code b} * (as in Rayleigh-quotient iteration), then better precision may be * achieved with {@code goodb} set to {@code true}. *

*

* {@code 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. *

* * @param a the linear operator A of the system * @param b the right-hand side vector * @param goodb usually {@code false}, except if {@code x} is expected to * contain a large multiple of {@code b} * @param shift the amount to be subtracted to all diagonal elements of A * @return a reference to {@code x} * @throws NullArgumentException if one of the parameters is {@code null} * @throws MathIllegalArgumentException if {@code a} is not square * @throws MathIllegalArgumentException if {@code b} has dimensions * inconsistent with {@code a} * @throws MathIllegalStateException at exhaustion of the iteration count, * unless a custom * {@link org.hipparchus.util.Incrementor.MaxCountExceededCallback callback} * has been set at construction of the {@link IterationManager} * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} is not self-adjoint * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ public RealVector solve(final RealLinearOperator a, final RealVector b, final boolean goodb, final double shift) throws MathIllegalArgumentException, NullArgumentException, MathIllegalStateException { MathUtils.checkNotNull(a); final RealVector x = new ArrayRealVector(a.getColumnDimension()); return solveInPlace(a, null, b, x, goodb, shift); } /** * {@inheritDoc} * * @param x not meaningful in this implementation; should not be considered * as an initial guess (more) * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} is not self-adjoint * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solve(final RealLinearOperator a, final RealVector b, final RealVector x) throws MathIllegalArgumentException, NullArgumentException, MathIllegalArgumentException, MathIllegalStateException { MathUtils.checkNotNull(x); return solveInPlace(a, null, b, x.copy(), false, 0.); } /** * {@inheritDoc} * * @param x the vector to be updated with the solution; {@code x} should * not be considered as an initial guess (more) * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} or {@code m} is not self-adjoint * @throws MathIllegalArgumentException if {@code m} is not * positive definite * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solveInPlace(final RealLinearOperator a, final RealLinearOperator m, final RealVector b, final RealVector x) throws MathIllegalArgumentException, NullArgumentException, MathIllegalArgumentException, MathIllegalStateException { return solveInPlace(a, m, b, x, false, 0.); } /** * Returns an estimate of the solution to the linear system (A - shift * · I) · x = b. The solution is computed in-place. *

* If the solution x is expected to contain a large multiple of {@code b} * (as in Rayleigh-quotient iteration), then better precision may be * achieved with {@code goodb} set to {@code true}; this however requires an * extra call to the preconditioner. *

*

* {@code 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. *

* * @param a the linear operator A of the system * @param m the preconditioner, M (can be {@code null}) * @param b the right-hand side vector * @param x the vector to be updated with the solution; {@code x} should * not be considered as an initial guess (more) * @param goodb usually {@code false}, except if {@code x} is expected to * contain a large multiple of {@code b} * @param shift the amount to be subtracted to all diagonal elements of A * @return a reference to {@code x} (shallow copy). * @throws NullArgumentException if one of the parameters is {@code null} * @throws MathIllegalArgumentException if {@code a} or {@code m} is not square * @throws MathIllegalArgumentException if {@code m}, {@code b} or {@code x} * have dimensions inconsistent with {@code a}. * @throws MathIllegalStateException at exhaustion of the iteration count, * unless a custom * {@link org.hipparchus.util.Incrementor.MaxCountExceededCallback callback} * has been set at construction of the {@link IterationManager} * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} or {@code m} is not self-adjoint * @throws MathIllegalArgumentException if {@code m} is not positive definite * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ public RealVector solveInPlace(final RealLinearOperator a, final RealLinearOperator m, final RealVector b, final RealVector x, final boolean goodb, final double shift) throws MathIllegalArgumentException, NullArgumentException, MathIllegalStateException { checkParameters(a, m, b, x); final IterationManager manager = getIterationManager(); /* Initialization counts as an iteration. */ manager.resetIterationCount(); manager.incrementIterationCount(); final State state; state = new State(a, m, b, goodb, shift, delta, check); state.init(); state.refineSolution(x); IterativeLinearSolverEvent event; event = new DefaultIterativeLinearSolverEvent(this, manager.getIterations(), x, b, state.getNormOfResidual()); if (state.bEqualsNullVector()) { /* If b = 0 exactly, stop with x = 0. */ manager.fireTerminationEvent(event); return x; } /* Cause termination if beta is essentially zero. */ final boolean earlyStop; earlyStop = state.betaEqualsZero() || state.hasConverged(); manager.fireInitializationEvent(event); if (!earlyStop) { do { manager.incrementIterationCount(); event = new DefaultIterativeLinearSolverEvent(this, manager.getIterations(), x, b, state.getNormOfResidual()); manager.fireIterationStartedEvent(event); state.update(); state.refineSolution(x); event = new DefaultIterativeLinearSolverEvent(this, manager.getIterations(), x, b, state.getNormOfResidual()); manager.fireIterationPerformedEvent(event); } while (!state.hasConverged()); } event = new DefaultIterativeLinearSolverEvent(this, manager.getIterations(), x, b, state.getNormOfResidual()); manager.fireTerminationEvent(event); return x; } /** * {@inheritDoc} * * @param x the vector to be updated with the solution; {@code x} should * not be considered as an initial guess (more) * @throws MathIllegalArgumentException if {@link #getCheck()} is * {@code true}, and {@code a} is not self-adjoint * @throws MathIllegalArgumentException if {@code a} is ill-conditioned */ @Override public RealVector solveInPlace(final RealLinearOperator a, final RealVector b, final RealVector x) throws MathIllegalArgumentException, NullArgumentException, MathIllegalArgumentException, MathIllegalStateException { return solveInPlace(a, null, b, x, false, 0.); } }




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