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 * 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
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package org.apache.commons.math3.optimization.general;

import org.apache.commons.math3.analysis.DifferentiableMultivariateVectorFunction;
import org.apache.commons.math3.analysis.FunctionUtils;
import org.apache.commons.math3.analysis.differentiation.DerivativeStructure;
import org.apache.commons.math3.analysis.differentiation.MultivariateDifferentiableVectorFunction;
import org.apache.commons.math3.exception.DimensionMismatchException;
import org.apache.commons.math3.exception.NumberIsTooSmallException;
import org.apache.commons.math3.exception.util.LocalizedFormats;
import org.apache.commons.math3.linear.ArrayRealVector;
import org.apache.commons.math3.linear.RealMatrix;
import org.apache.commons.math3.linear.DiagonalMatrix;
import org.apache.commons.math3.linear.DecompositionSolver;
import org.apache.commons.math3.linear.MatrixUtils;
import org.apache.commons.math3.linear.QRDecomposition;
import org.apache.commons.math3.linear.EigenDecomposition;
import org.apache.commons.math3.optimization.OptimizationData;
import org.apache.commons.math3.optimization.InitialGuess;
import org.apache.commons.math3.optimization.Target;
import org.apache.commons.math3.optimization.Weight;
import org.apache.commons.math3.optimization.ConvergenceChecker;
import org.apache.commons.math3.optimization.DifferentiableMultivariateVectorOptimizer;
import org.apache.commons.math3.optimization.PointVectorValuePair;
import org.apache.commons.math3.optimization.direct.BaseAbstractMultivariateVectorOptimizer;
import org.apache.commons.math3.util.FastMath;

/**
 * Base class for implementing least squares optimizers.
 * It handles the boilerplate methods associated to thresholds settings,
 * Jacobian and error estimation.
 * 
* This class constructs the Jacobian matrix of the function argument in method * {@link BaseAbstractMultivariateVectorOptimizer#optimize(int, * org.apache.commons.math3.analysis.MultivariateVectorFunction,OptimizationData[]) * optimize} and assumes that the rows of that matrix iterate on the model * functions while the columns iterate on the parameters; thus, the numbers * of rows is equal to the dimension of the * {@link org.apache.commons.math3.optimization.Target Target} while * the number of columns is equal to the dimension of the * {@link org.apache.commons.math3.optimization.InitialGuess InitialGuess}. * * @deprecated As of 3.1 (to be removed in 4.0). * @since 1.2 */ @Deprecated public abstract class AbstractLeastSquaresOptimizer extends BaseAbstractMultivariateVectorOptimizer implements DifferentiableMultivariateVectorOptimizer { /** * Singularity threshold (cf. {@link #getCovariances(double)}). * @deprecated As of 3.1. */ @Deprecated private static final double DEFAULT_SINGULARITY_THRESHOLD = 1e-14; /** * Jacobian matrix of the weighted residuals. * This matrix is in canonical form just after the calls to * {@link #updateJacobian()}, but may be modified by the solver * in the derived class (the {@link LevenbergMarquardtOptimizer * Levenberg-Marquardt optimizer} does this). * @deprecated As of 3.1. To be removed in 4.0. Please use * {@link #computeWeightedJacobian(double[])} instead. */ @Deprecated protected double[][] weightedResidualJacobian; /** Number of columns of the jacobian matrix. * @deprecated As of 3.1. */ @Deprecated protected int cols; /** Number of rows of the jacobian matrix. * @deprecated As of 3.1. */ @Deprecated protected int rows; /** Current point. * @deprecated As of 3.1. */ @Deprecated protected double[] point; /** Current objective function value. * @deprecated As of 3.1. */ @Deprecated protected double[] objective; /** Weighted residuals * @deprecated As of 3.1. */ @Deprecated protected double[] weightedResiduals; /** Cost value (square root of the sum of the residuals). * @deprecated As of 3.1. Field to become "private" in 4.0. * Please use {@link #setCost(double)}. */ @Deprecated protected double cost; /** Objective function derivatives. */ private MultivariateDifferentiableVectorFunction jF; /** Number of evaluations of the Jacobian. */ private int jacobianEvaluations; /** Square-root of the weight matrix. */ private RealMatrix weightMatrixSqrt; /** * Simple constructor with default settings. * The convergence check is set to a {@link * org.apache.commons.math3.optimization.SimpleVectorValueChecker}. * @deprecated See {@link org.apache.commons.math3.optimization.SimpleValueChecker#SimpleValueChecker()} */ @Deprecated protected AbstractLeastSquaresOptimizer() {} /** * @param checker Convergence checker. */ protected AbstractLeastSquaresOptimizer(ConvergenceChecker checker) { super(checker); } /** * @return the number of evaluations of the Jacobian function. */ public int getJacobianEvaluations() { return jacobianEvaluations; } /** * Update the jacobian matrix. * * @throws DimensionMismatchException if the Jacobian dimension does not * match problem dimension. * @deprecated As of 3.1. Please use {@link #computeWeightedJacobian(double[])} * instead. */ @Deprecated protected void updateJacobian() { final RealMatrix weightedJacobian = computeWeightedJacobian(point); weightedResidualJacobian = weightedJacobian.scalarMultiply(-1).getData(); } /** * Computes the Jacobian matrix. * * @param params Model parameters at which to compute the Jacobian. * @return the weighted Jacobian: W1/2 J. * @throws DimensionMismatchException if the Jacobian dimension does not * match problem dimension. * @since 3.1 */ protected RealMatrix computeWeightedJacobian(double[] params) { ++jacobianEvaluations; final DerivativeStructure[] dsPoint = new DerivativeStructure[params.length]; final int nC = params.length; for (int i = 0; i < nC; ++i) { dsPoint[i] = new DerivativeStructure(nC, 1, i, params[i]); } final DerivativeStructure[] dsValue = jF.value(dsPoint); final int nR = getTarget().length; if (dsValue.length != nR) { throw new DimensionMismatchException(dsValue.length, nR); } final double[][] jacobianData = new double[nR][nC]; for (int i = 0; i < nR; ++i) { int[] orders = new int[nC]; for (int j = 0; j < nC; ++j) { orders[j] = 1; jacobianData[i][j] = dsValue[i].getPartialDerivative(orders); orders[j] = 0; } } return weightMatrixSqrt.multiply(MatrixUtils.createRealMatrix(jacobianData)); } /** * Update the residuals array and cost function value. * @throws DimensionMismatchException if the dimension does not match the * problem dimension. * @throws org.apache.commons.math3.exception.TooManyEvaluationsException * if the maximal number of evaluations is exceeded. * @deprecated As of 3.1. Please use {@link #computeResiduals(double[])}, * {@link #computeObjectiveValue(double[])}, {@link #computeCost(double[])} * and {@link #setCost(double)} instead. */ @Deprecated protected void updateResidualsAndCost() { objective = computeObjectiveValue(point); final double[] res = computeResiduals(objective); // Compute cost. cost = computeCost(res); // Compute weighted residuals. final ArrayRealVector residuals = new ArrayRealVector(res); weightedResiduals = weightMatrixSqrt.operate(residuals).toArray(); } /** * Computes the cost. * * @param residuals Residuals. * @return the cost. * @see #computeResiduals(double[]) * @since 3.1 */ protected double computeCost(double[] residuals) { final ArrayRealVector r = new ArrayRealVector(residuals); return FastMath.sqrt(r.dotProduct(getWeight().operate(r))); } /** * Get the Root Mean Square value. * Get the Root Mean Square value, i.e. the root of the arithmetic * mean of the square of all weighted residuals. This is related to the * criterion that is minimized by the optimizer as follows: if * c if the criterion, and n is the number of * measurements, then the RMS is sqrt (c/n). * * @return RMS value */ public double getRMS() { return FastMath.sqrt(getChiSquare() / rows); } /** * Get a Chi-Square-like value assuming the N residuals follow N * distinct normal distributions centered on 0 and whose variances are * the reciprocal of the weights. * @return chi-square value */ public double getChiSquare() { return cost * cost; } /** * Gets the square-root of the weight matrix. * * @return the square-root of the weight matrix. * @since 3.1 */ public RealMatrix getWeightSquareRoot() { return weightMatrixSqrt.copy(); } /** * Sets the cost. * * @param cost Cost value. * @since 3.1 */ protected void setCost(double cost) { this.cost = cost; } /** * Get the covariance matrix of the optimized parameters. * * @return the covariance matrix. * @throws org.apache.commons.math3.linear.SingularMatrixException * if the covariance matrix cannot be computed (singular problem). * @see #getCovariances(double) * @deprecated As of 3.1. Please use {@link #computeCovariances(double[],double)} * instead. */ @Deprecated public double[][] getCovariances() { return getCovariances(DEFAULT_SINGULARITY_THRESHOLD); } /** * Get the covariance matrix of the optimized parameters. *
* Note that this operation involves the inversion of the * JTJ matrix, where {@code J} is the * Jacobian matrix. * The {@code threshold} parameter is a way for the caller to specify * that the result of this computation should be considered meaningless, * and thus trigger an exception. * * @param threshold Singularity threshold. * @return the covariance matrix. * @throws org.apache.commons.math3.linear.SingularMatrixException * if the covariance matrix cannot be computed (singular problem). * @deprecated As of 3.1. Please use {@link #computeCovariances(double[],double)} * instead. */ @Deprecated public double[][] getCovariances(double threshold) { return computeCovariances(point, threshold); } /** * Get the covariance matrix of the optimized parameters. *
* Note that this operation involves the inversion of the * JTJ matrix, where {@code J} is the * Jacobian matrix. * The {@code threshold} parameter is a way for the caller to specify * that the result of this computation should be considered meaningless, * and thus trigger an exception. * * @param params Model parameters. * @param threshold Singularity threshold. * @return the covariance matrix. * @throws org.apache.commons.math3.linear.SingularMatrixException * if the covariance matrix cannot be computed (singular problem). * @since 3.1 */ public double[][] computeCovariances(double[] params, double threshold) { // Set up the Jacobian. final RealMatrix j = computeWeightedJacobian(params); // Compute transpose(J)J. final RealMatrix jTj = j.transpose().multiply(j); // Compute the covariances matrix. final DecompositionSolver solver = new QRDecomposition(jTj, threshold).getSolver(); return solver.getInverse().getData(); } /** *

* Returns an estimate of the standard deviation of each parameter. The * returned values are the so-called (asymptotic) standard errors on the * parameters, defined as {@code sd(a[i]) = sqrt(S / (n - m) * C[i][i])}, * where {@code a[i]} is the optimized value of the {@code i}-th parameter, * {@code S} is the minimized value of the sum of squares objective function * (as returned by {@link #getChiSquare()}), {@code n} is the number of * observations, {@code m} is the number of parameters and {@code C} is the * covariance matrix. *

*

* See also * Wikipedia, * or * MathWorld, * equations (34) and (35) for a particular case. *

* * @return an estimate of the standard deviation of the optimized parameters * @throws org.apache.commons.math3.linear.SingularMatrixException * if the covariance matrix cannot be computed. * @throws NumberIsTooSmallException if the number of degrees of freedom is not * positive, i.e. the number of measurements is less or equal to the number of * parameters. * @deprecated as of version 3.1, {@link #computeSigma(double[],double)} should be used * instead. It should be emphasized that {@code guessParametersErrors} and * {@code computeSigma} are not strictly equivalent. */ @Deprecated public double[] guessParametersErrors() { if (rows <= cols) { throw new NumberIsTooSmallException(LocalizedFormats.NO_DEGREES_OF_FREEDOM, rows, cols, false); } double[] errors = new double[cols]; final double c = FastMath.sqrt(getChiSquare() / (rows - cols)); double[][] covar = computeCovariances(point, 1e-14); for (int i = 0; i < errors.length; ++i) { errors[i] = FastMath.sqrt(covar[i][i]) * c; } return errors; } /** * Computes an estimate of the standard deviation of the parameters. The * returned values are the square root of the diagonal coefficients of the * covariance matrix, {@code sd(a[i]) ~= sqrt(C[i][i])}, where {@code a[i]} * is the optimized value of the {@code i}-th parameter, and {@code C} is * the covariance matrix. * * @param params Model parameters. * @param covarianceSingularityThreshold Singularity threshold (see * {@link #computeCovariances(double[],double) computeCovariances}). * @return an estimate of the standard deviation of the optimized parameters * @throws org.apache.commons.math3.linear.SingularMatrixException * if the covariance matrix cannot be computed. * @since 3.1 */ public double[] computeSigma(double[] params, double covarianceSingularityThreshold) { final int nC = params.length; final double[] sig = new double[nC]; final double[][] cov = computeCovariances(params, covarianceSingularityThreshold); for (int i = 0; i < nC; ++i) { sig[i] = FastMath.sqrt(cov[i][i]); } return sig; } /** {@inheritDoc} * @deprecated As of 3.1. Please use * {@link BaseAbstractMultivariateVectorOptimizer#optimize(int, * org.apache.commons.math3.analysis.MultivariateVectorFunction,OptimizationData[]) * optimize(int,MultivariateDifferentiableVectorFunction,OptimizationData...)} * instead. */ @Override @Deprecated public PointVectorValuePair optimize(int maxEval, final DifferentiableMultivariateVectorFunction f, final double[] target, final double[] weights, final double[] startPoint) { return optimizeInternal(maxEval, FunctionUtils.toMultivariateDifferentiableVectorFunction(f), new Target(target), new Weight(weights), new InitialGuess(startPoint)); } /** * Optimize an objective function. * Optimization is considered to be a weighted least-squares minimization. * The cost function to be minimized is * ∑weighti(objectivei - targeti)2 * * @param f Objective function. * @param target Target value for the objective functions at optimum. * @param weights Weights for the least squares cost computation. * @param startPoint Start point for optimization. * @return the point/value pair giving the optimal value for objective * function. * @param maxEval Maximum number of function evaluations. * @throws org.apache.commons.math3.exception.DimensionMismatchException * if the start point dimension is wrong. * @throws org.apache.commons.math3.exception.TooManyEvaluationsException * if the maximal number of evaluations is exceeded. * @throws org.apache.commons.math3.exception.NullArgumentException if * any argument is {@code null}. * @deprecated As of 3.1. Please use * {@link BaseAbstractMultivariateVectorOptimizer#optimize(int, * org.apache.commons.math3.analysis.MultivariateVectorFunction,OptimizationData[]) * optimize(int,MultivariateDifferentiableVectorFunction,OptimizationData...)} * instead. */ @Deprecated public PointVectorValuePair optimize(final int maxEval, final MultivariateDifferentiableVectorFunction f, final double[] target, final double[] weights, final double[] startPoint) { return optimizeInternal(maxEval, f, new Target(target), new Weight(weights), new InitialGuess(startPoint)); } /** * Optimize an objective function. * Optimization is considered to be a weighted least-squares minimization. * The cost function to be minimized is * ∑weighti(objectivei - targeti)2 * * @param maxEval Allowed number of evaluations of the objective function. * @param f Objective function. * @param optData Optimization data. The following data will be looked for: *
    *
  • {@link Target}
  • *
  • {@link Weight}
  • *
  • {@link InitialGuess}
  • *
* @return the point/value pair giving the optimal value of the objective * function. * @throws org.apache.commons.math3.exception.TooManyEvaluationsException if * the maximal number of evaluations is exceeded. * @throws DimensionMismatchException if the target, and weight arguments * have inconsistent dimensions. * @see BaseAbstractMultivariateVectorOptimizer#optimizeInternal(int, * org.apache.commons.math3.analysis.MultivariateVectorFunction,OptimizationData[]) * @since 3.1 * @deprecated As of 3.1. Override is necessary only until this class's generic * argument is changed to {@code MultivariateDifferentiableVectorFunction}. */ @Deprecated protected PointVectorValuePair optimizeInternal(final int maxEval, final MultivariateDifferentiableVectorFunction f, OptimizationData... optData) { // XXX Conversion will be removed when the generic argument of the // base class becomes "MultivariateDifferentiableVectorFunction". return super.optimizeInternal(maxEval, FunctionUtils.toDifferentiableMultivariateVectorFunction(f), optData); } /** {@inheritDoc} */ @Override protected void setUp() { super.setUp(); // Reset counter. jacobianEvaluations = 0; // Square-root of the weight matrix. weightMatrixSqrt = squareRoot(getWeight()); // Store least squares problem characteristics. // XXX The conversion won't be necessary when the generic argument of // the base class becomes "MultivariateDifferentiableVectorFunction". // XXX "jF" is not strictly necessary anymore but is currently more // efficient than converting the value returned from "getObjectiveFunction()" // every time it is used. jF = FunctionUtils.toMultivariateDifferentiableVectorFunction((DifferentiableMultivariateVectorFunction) getObjectiveFunction()); // Arrays shared with "private" and "protected" methods. point = getStartPoint(); rows = getTarget().length; cols = point.length; } /** * Computes the residuals. * The residual is the difference between the observed (target) * values and the model (objective function) value. * There is one residual for each element of the vector-valued * function. * * @param objectiveValue Value of the the objective function. This is * the value returned from a call to * {@link #computeObjectiveValue(double[]) computeObjectiveValue} * (whose array argument contains the model parameters). * @return the residuals. * @throws DimensionMismatchException if {@code params} has a wrong * length. * @since 3.1 */ protected double[] computeResiduals(double[] objectiveValue) { final double[] target = getTarget(); if (objectiveValue.length != target.length) { throw new DimensionMismatchException(target.length, objectiveValue.length); } final double[] residuals = new double[target.length]; for (int i = 0; i < target.length; i++) { residuals[i] = target[i] - objectiveValue[i]; } return residuals; } /** * Computes the square-root of the weight matrix. * * @param m Symmetric, positive-definite (weight) matrix. * @return the square-root of the weight matrix. */ private RealMatrix squareRoot(RealMatrix m) { if (m instanceof DiagonalMatrix) { final int dim = m.getRowDimension(); final RealMatrix sqrtM = new DiagonalMatrix(dim); for (int i = 0; i < dim; i++) { sqrtM.setEntry(i, i, FastMath.sqrt(m.getEntry(i, i))); } return sqrtM; } else { final EigenDecomposition dec = new EigenDecomposition(m); return dec.getSquareRoot(); } } }




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