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 程式師世界 >> 編程語言 >> JAVA編程 >> 關於JAVA >> java隨機數生成詳細完成代碼

java隨機數生成詳細完成代碼

編輯:關於JAVA

java隨機數生成詳細完成代碼。本站提示廣大學習愛好者:(java隨機數生成詳細完成代碼)文章只能為提供參考,不一定能成為您想要的結果。以下是java隨機數生成詳細完成代碼正文


本文實例為年夜家分享了java隨機數生成代碼,供年夜家參考,詳細內容以下

package com.gonvan.common.utils;
 
import java.util.*;
 
/**
 * 隨機數對象
 *
 * @author yuerzm
 *   
 */
public final class LotteryAliasMethod {
 
  /**
   * The random number generator used to sample from the distribution.
   */
  private final Random  random;
 
  /**
   * The alias tables.
   */
  private final int[]   alias;
 
  /**
   * The probability tables.
   */
  private final double[] probability;
 
  /**
   * Constructs a new AliasMethod to sample from a discrete distribution and
   * hand back outcomes based on the probability distribution.
   * <p/>
   * Given as input a list of probabilities corresponding to outcomes 0, 1,
   * ..., n - 1, this constructor creates the probability and alias tables
   * needed to efficiently sample from this distribution.
   *
   * @param probabilities
   *      The list of probabilities.
   */
  public LotteryAliasMethod(List<Double> probabilities) {
    this(probabilities, new Random());
  }
 
  /**
   * Constructs a new AliasMethod to sample from a discrete distribution and
   * hand back outcomes based on the probability distribution.
   * <p/>
   * Given as input a list of probabilities corresponding to outcomes 0, 1,
   * ..., n - 1, along with the random number generator that should be used as
   * the underlying generator, this constructor creates the probability and
   * alias tables needed to efficiently sample from this distribution.
   *
   * @param probabilities
   *      The list of probabilities.
   * @param random
   *      The random number generator
   */
  public LotteryAliasMethod(List<Double> probabilities, Random random) {
    /* Begin by doing basic structural checks on the inputs. */
    if (probabilities == null || random == null)
      throw new NullPointerException();
    if (probabilities.size() == 0)
      throw new IllegalArgumentException("Probability vector must be nonempty.");
 
    /* Allocate space for the probability and alias tables. */
    probability = new double[probabilities.size()];
    alias = new int[probabilities.size()];
 
    /* Store the underlying generator. */
    this.random = random;
 
    /* Compute the average probability and cache it for later use. */
    final double average = 1.0 / probabilities.size();
 
    /*
     * Make a copy of the probabilities list, since we will be making
     * changes to it.
     */
    probabilities = new ArrayList<Double>(probabilities);
 
    /* Create two stacks to act as worklists as we populate the tables. */
    Deque<Integer> small = new ArrayDeque<Integer>();
    Deque<Integer> large = new ArrayDeque<Integer>();
 
    /* Populate the stacks with the input probabilities. */
    for (int i = 0; i < probabilities.size(); ++i) {
      /*
       * If the probability is below the average probability, then we add
       * it to the small list; otherwise we add it to the large list.
       */
      if (probabilities.get(i) >= average)
        large.add(i);
      else
        small.add(i);
    }
 
    /*
     * As a note: in the mathematical specification of the algorithm, we
     * will always exhaust the small list before the big list. However,
     * due to floating point inaccuracies, this is not necessarily true.
     * Consequently, this inner loop (which tries to pair small and large
     * elements) will have to check that both lists aren't empty.
     */
    while (!small.isEmpty() && !large.isEmpty()) {
      /* Get the index of the small and the large probabilities. */
      int less = small.removeLast();
      int more = large.removeLast();
 
      /*
       * These probabilities have not yet been scaled up to be such that
       * 1/n is given weight 1.0. We do this here instead.
       */
      probability[less] = probabilities.get(less) * probabilities.size();
      alias[less] = more;
 
      /*
       * Decrease the probability of the larger one by the appropriate
       * amount.
       */
      probabilities.set(more, (probabilities.get(more) + probabilities.get(less)) - average);
 
      /*
       * If the new probability is less than the average, add it into the
       * small list; otherwise add it to the large list.
       */
      if (probabilities.get(more) >= 1.0 / probabilities.size())
        large.add(more);
      else
        small.add(more);
    }
 
    /*
     * At this point, everything is in one list, which means that the
     * remaining probabilities should all be 1/n. Based on this, set them
     * appropriately. Due to numerical issues, we can't be sure which
     * stack will hold the entries, so we empty both.
     */
    while (!small.isEmpty())
      probability[small.removeLast()] = 1.0;
    while (!large.isEmpty())
      probability[large.removeLast()] = 1.0;
  }
 
  /**
   * Samples a value from the underlying distribution.
   *
   * @return A random value sampled from the underlying distribution.
   */
  public int next() {
    /* Generate a fair die roll to determine which column to inspect. */
    int column = random.nextInt(probability.length);
 
    /* Generate a biased coin toss to determine which option to pick. */
    boolean coinToss = random.nextDouble() < probability[column];
 
    /* Based on the outcome, return either the column or its alias. */
    return coinToss ? column : alias[column];
  }
 
}

以上就是本文的全體內容,願望對年夜家的進修有所贊助。

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