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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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 *      http://www.apache.org/licenses/LICENSE-2.0
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package org.apache.commons.math3.optimization.direct;

import org.apache.commons.math3.analysis.MultivariateFunction;
import org.apache.commons.math3.analysis.UnivariateFunction;
import org.apache.commons.math3.analysis.function.Logit;
import org.apache.commons.math3.analysis.function.Sigmoid;
import org.apache.commons.math3.exception.DimensionMismatchException;
import org.apache.commons.math3.exception.NumberIsTooSmallException;
import org.apache.commons.math3.util.FastMath;
import org.apache.commons.math3.util.MathUtils;

/**
 * 

Adapter for mapping bounded {@link MultivariateFunction} to unbounded ones.

* *

* This adapter can be used to wrap functions subject to simple bounds on * parameters so they can be used by optimizers that do not directly * support simple bounds. *

*

* The principle is that the user function that will be wrapped will see its * parameters bounded as required, i.e when its {@code value} method is called * with argument array {@code point}, the elements array will fulfill requirement * {@code lower[i] <= point[i] <= upper[i]} for all i. Some of the components * may be unbounded or bounded only on one side if the corresponding bound is * set to an infinite value. The optimizer will not manage the user function by * itself, but it will handle this adapter and it is this adapter that will take * care the bounds are fulfilled. The adapter {@link #value(double[])} method will * be called by the optimizer with unbound parameters, and the adapter will map * the unbounded value to the bounded range using appropriate functions like * {@link Sigmoid} for double bounded elements for example. *

*

* As the optimizer sees only unbounded parameters, it should be noted that the * start point or simplex expected by the optimizer should be unbounded, so the * user is responsible for converting his bounded point to unbounded by calling * {@link #boundedToUnbounded(double[])} before providing them to the optimizer. * For the same reason, the point returned by the {@link * org.apache.commons.math3.optimization.BaseMultivariateOptimizer#optimize(int, * MultivariateFunction, org.apache.commons.math3.optimization.GoalType, double[])} * method is unbounded. So to convert this point to bounded, users must call * {@link #unboundedToBounded(double[])} by themselves!

*

* This adapter is only a poor man solution to simple bounds optimization constraints * that can be used with simple optimizers like {@link SimplexOptimizer} with {@link * NelderMeadSimplex} or {@link MultiDirectionalSimplex}. A better solution is to use * an optimizer that directly supports simple bounds like {@link CMAESOptimizer} or * {@link BOBYQAOptimizer}. One caveat of this poor man solution is that behavior near * the bounds may be numerically unstable as bounds are mapped from infinite values. * Another caveat is that convergence values are evaluated by the optimizer with respect * to unbounded variables, so there will be scales differences when converted to bounded * variables. *

* * @see MultivariateFunctionPenaltyAdapter * * @deprecated As of 3.1 (to be removed in 4.0). * @since 3.0 */ @Deprecated public class MultivariateFunctionMappingAdapter implements MultivariateFunction { /** Underlying bounded function. */ private final MultivariateFunction bounded; /** Mapping functions. */ private final Mapper[] mappers; /** Simple constructor. * @param bounded bounded function * @param lower lower bounds for each element of the input parameters array * (some elements may be set to {@code Double.NEGATIVE_INFINITY} for * unbounded values) * @param upper upper bounds for each element of the input parameters array * (some elements may be set to {@code Double.POSITIVE_INFINITY} for * unbounded values) * @exception DimensionMismatchException if lower and upper bounds are not * consistent, either according to dimension or to values */ public MultivariateFunctionMappingAdapter(final MultivariateFunction bounded, final double[] lower, final double[] upper) { // safety checks MathUtils.checkNotNull(lower); MathUtils.checkNotNull(upper); if (lower.length != upper.length) { throw new DimensionMismatchException(lower.length, upper.length); } for (int i = 0; i < lower.length; ++i) { // note the following test is written in such a way it also fails for NaN if (!(upper[i] >= lower[i])) { throw new NumberIsTooSmallException(upper[i], lower[i], true); } } this.bounded = bounded; this.mappers = new Mapper[lower.length]; for (int i = 0; i < mappers.length; ++i) { if (Double.isInfinite(lower[i])) { if (Double.isInfinite(upper[i])) { // element is unbounded, no transformation is needed mappers[i] = new NoBoundsMapper(); } else { // element is simple-bounded on the upper side mappers[i] = new UpperBoundMapper(upper[i]); } } else { if (Double.isInfinite(upper[i])) { // element is simple-bounded on the lower side mappers[i] = new LowerBoundMapper(lower[i]); } else { // element is double-bounded mappers[i] = new LowerUpperBoundMapper(lower[i], upper[i]); } } } } /** Map an array from unbounded to bounded. * @param point unbounded value * @return bounded value */ public double[] unboundedToBounded(double[] point) { // map unbounded input point to bounded point final double[] mapped = new double[mappers.length]; for (int i = 0; i < mappers.length; ++i) { mapped[i] = mappers[i].unboundedToBounded(point[i]); } return mapped; } /** Map an array from bounded to unbounded. * @param point bounded value * @return unbounded value */ public double[] boundedToUnbounded(double[] point) { // map bounded input point to unbounded point final double[] mapped = new double[mappers.length]; for (int i = 0; i < mappers.length; ++i) { mapped[i] = mappers[i].boundedToUnbounded(point[i]); } return mapped; } /** Compute the underlying function value from an unbounded point. *

* This method simply bounds the unbounded point using the mappings * set up at construction and calls the underlying function using * the bounded point. *

* @param point unbounded value * @return underlying function value * @see #unboundedToBounded(double[]) */ public double value(double[] point) { return bounded.value(unboundedToBounded(point)); } /** Mapping interface. */ private interface Mapper { /** Map a value from unbounded to bounded. * @param y unbounded value * @return bounded value */ double unboundedToBounded(double y); /** Map a value from bounded to unbounded. * @param x bounded value * @return unbounded value */ double boundedToUnbounded(double x); } /** Local class for no bounds mapping. */ private static class NoBoundsMapper implements Mapper { /** Simple constructor. */ NoBoundsMapper() { } /** {@inheritDoc} */ public double unboundedToBounded(final double y) { return y; } /** {@inheritDoc} */ public double boundedToUnbounded(final double x) { return x; } } /** Local class for lower bounds mapping. */ private static class LowerBoundMapper implements Mapper { /** Low bound. */ private final double lower; /** Simple constructor. * @param lower lower bound */ LowerBoundMapper(final double lower) { this.lower = lower; } /** {@inheritDoc} */ public double unboundedToBounded(final double y) { return lower + FastMath.exp(y); } /** {@inheritDoc} */ public double boundedToUnbounded(final double x) { return FastMath.log(x - lower); } } /** Local class for upper bounds mapping. */ private static class UpperBoundMapper implements Mapper { /** Upper bound. */ private final double upper; /** Simple constructor. * @param upper upper bound */ UpperBoundMapper(final double upper) { this.upper = upper; } /** {@inheritDoc} */ public double unboundedToBounded(final double y) { return upper - FastMath.exp(-y); } /** {@inheritDoc} */ public double boundedToUnbounded(final double x) { return -FastMath.log(upper - x); } } /** Local class for lower and bounds mapping. */ private static class LowerUpperBoundMapper implements Mapper { /** Function from unbounded to bounded. */ private final UnivariateFunction boundingFunction; /** Function from bounded to unbounded. */ private final UnivariateFunction unboundingFunction; /** Simple constructor. * @param lower lower bound * @param upper upper bound */ LowerUpperBoundMapper(final double lower, final double upper) { boundingFunction = new Sigmoid(lower, upper); unboundingFunction = new Logit(lower, upper); } /** {@inheritDoc} */ public double unboundedToBounded(final double y) { return boundingFunction.value(y); } /** {@inheritDoc} */ public double boundedToUnbounded(final double x) { return unboundingFunction.value(x); } } }




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