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    * Licensed to the Apache Software Foundation (ASF) under one or more
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    * 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
    *
    *      http://www.apache.org/licenses/LICENSE-2.0
   *
   * Unless required by applicable law or agreed to in writing, software
   * distributed under the License is distributed on an "AS IS" BASIS,
   * WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
   * See the License for the specific language governing permissions and
   * limitations under the License.
   */
  package org.apache.commons.math4.legacy.analysis.interpolation;
  
  import org.apache.commons.math4.legacy.analysis.polynomials.PolynomialFunctionLagrangeForm;
  import org.apache.commons.math4.legacy.analysis.polynomials.PolynomialFunctionNewtonForm;
  import org.apache.commons.math4.legacy.exception.DimensionMismatchException;
  import org.apache.commons.math4.legacy.exception.NonMonotonicSequenceException;
  import org.apache.commons.math4.legacy.exception.NumberIsTooSmallException;
  
  /**
   * Implements the <a href=
   * "http://mathworld.wolfram.com/NewtonsDividedDifferenceInterpolationFormula.html">
   * Divided Difference Algorithm</a> for interpolation of real univariate
   * functions. For reference, see <b>Introduction to Numerical Analysis</b>,
   * ISBN 038795452X, chapter 2.
   * <p>
   * The actual code of Neville's evaluation is in PolynomialFunctionLagrangeForm,
   * this class provides an easy-to-use interface to it.</p>
   *
   * @since 1.2
   */
  public class DividedDifferenceInterpolator
      implements UnivariateInterpolator {
      /**
       * Compute an interpolating function for the dataset.
       *
       * @param x Interpolating points array.
       * @param y Interpolating values array.
       * @return a function which interpolates the dataset.
       * @throws DimensionMismatchException if the array lengths are different.
       * @throws NumberIsTooSmallException if the number of points is less than 2.
       * @throws NonMonotonicSequenceException if {@code x} is not sorted in
       * strictly increasing order.
       */
      @Override
      public PolynomialFunctionNewtonForm interpolate(double[] x, double[] y)
          throws DimensionMismatchException,
                 NumberIsTooSmallException,
                 NonMonotonicSequenceException {
          /*
           * a[] and c[] are defined in the general formula of Newton form:
           * p(x) = a[0] + a[1](x-c[0]) + a[2](x-c[0])(x-c[1]) + ... +
           *        a[n](x-c[0])(x-c[1])...(x-c[n-1])
           */
          PolynomialFunctionLagrangeForm.verifyInterpolationArray(x, y, true);
  
          /*
           * When used for interpolation, the Newton form formula becomes
           * p(x) = f[x0] + f[x0,x1](x-x0) + f[x0,x1,x2](x-x0)(x-x1) + ... +
           *        f[x0,x1,...,x[n-1]](x-x0)(x-x1)...(x-x[n-2])
           * Therefore, a[k] = f[x0,x1,...,xk], c[k] = x[k].
           * <p>
           * Note x[], y[], a[] have the same length but c[]'s size is one less.</p>
           */
          final double[] c = new double[x.length-1];
          System.arraycopy(x, 0, c, 0, c.length);
  
          final double[] a = computeDividedDifference(x, y);
          return new PolynomialFunctionNewtonForm(a, c);
      }
  
      /**
       * Return a copy of the divided difference array.
       * <p>
       * The divided difference array is defined recursively by <pre>
       * f[x0] = f(x0)
       * f[x0,x1,...,xk] = (f[x1,...,xk] - f[x0,...,x[k-1]]) / (xk - x0)
       * </pre>
       * <p>
       * The computational complexity is \(O(n^2)\) where \(n\) is the common
       * length of {@code x} and {@code y}.</p>
       *
       * @param x Interpolating points array.
       * @param y Interpolating values array.
       * @return a fresh copy of the divided difference array.
       * @throws DimensionMismatchException if the array lengths are different.
       * @throws NumberIsTooSmallException if the number of points is less than 2.
       * @throws NonMonotonicSequenceException
       * if {@code x} is not sorted in strictly increasing order.
       */
      protected static double[] computeDividedDifference(final double[] x, final double[] y)
          throws DimensionMismatchException,
                 NumberIsTooSmallException,
                 NonMonotonicSequenceException {
         PolynomialFunctionLagrangeForm.verifyInterpolationArray(x, y, true);
 
         final double[] divdiff = y.clone(); // initialization
 
         final int n = x.length;
         final double[] a = new double [n];
         a[0] = divdiff[0];
         for (int i = 1; i < n; i++) {
             for (int j = 0; j < n-i; j++) {
                 final double denominator = x[j+i] - x[j];
                 divdiff[j] = (divdiff[j+1] - divdiff[j]) / denominator;
             }
             a[i] = divdiff[0];
         }
 
         return a;
     }
 }