Maximum Gap

描述

Given an unsorted array, find the maximum difference between the successive elements in its sorted form.

Try to solve it in linear time/space.

Return 0 if the array contains less than 2 elements.

You may assume all elements in the array are non-negative integers and fit in the 32-bit signed integer range.

分析

这道题最直接的解法是,先排序,得到有序数组,然后相邻元素相减,找出差最大的,时间复杂度O(n log n)

然而本题要求O(n)时间,有没有O(n)的排序算法呢?桶排序、基数排序、计数排序。

解法1 桶排序

  1. // Maximum Gap
  2. // Bucket Sort
  3. // Time Complexity: O(n+k), Space Complexity: O(n+k)
  4. public class Solution {
  5.     public int maximumGap(int[] nums) {
  6.         if (nums.length < 2) return 0;
  7.         bucketSort(nums);
  9.         int maxDiff = Integer.MIN_VALUE;
  10.         for (int i = 1; i < nums.length; ++i) {
  11.             maxDiff = Math.max(maxDiff, nums[i] - nums[i - 1]);
  12.         }
  13.         return maxDiff;
  14.     }
  16.     private static void bucketSort(int[] nums) {
  17.         if (nums.length < 2) return;
  18.         int minValue = Integer.MAX_VALUE;
  19.         int maxValue = Integer.MIN_VALUE;
  21.         for (int i : nums) {
  22.             minValue = Math.min(minValue, i);
  23.             maxValue = Math.max(maxValue, i);
  24.         }
  26.         final int bucketSize = (maxValue - minValue) / nums.length + 1;
  27.         final int bucketCount = (maxValue - minValue) / bucketSize + 1;
  28.         final ArrayList<Integer>[] buckets = new ArrayList[bucketCount];
  29.         for (int i = 0; i < buckets.length; ++i) {
  30.             buckets[i] = new ArrayList<>();
  31.         }
  33.         for (int x : nums) {
  34.             final int index = (x - minValue) / bucketSize;
  35.             buckets[index].add(x);
  36.         }
  38.         for (final ArrayList<Integer> list : buckets) {
  39.             Collections.sort(list);
  40.         }
  42.         int i = 0;
  43.         for (final ArrayList<Integer> list : buckets) {
  44.             for (int x : list) {
  45.                 nums[i++] = x;
  46.             }
  47.         }
  48.     }
  49. }

解法2 基数排序

  1. // Maximum Gap
  2. // Radix Sort
  3. // Time Complexity: O(nd), Space Complexity: O(n+d)
  4. public class Solution {
  5.     public int maximumGap(int[] nums) {
  6.         if (nums.length < 2) return 0;
  7.         radixSort(nums);
  9.         int maxDiff = Integer.MIN_VALUE;
  10.         for (int i = 1; i < nums.length; ++i) {
  11.             maxDiff = Math.max(maxDiff, nums[i] - nums[i - 1]);
  12.         }
  13.         return maxDiff;
  14.     }
  15.     private static void radixSort(int[] nums) {
  16.         int minValue = Integer.MAX_VALUE;
  17.         int maxValue = Integer.MIN_VALUE;
  19.         for (int i : nums) {
  20.             minValue = Math.min(minValue, i);
  21.             maxValue = Math.max(maxValue, i);
  22.         }
  24.         final int D = Integer.toString(maxValue - minValue).length();
  25.         final ArrayList<Integer>[] buckets = new ArrayList[10];
  26.         for (int i = 0; i < buckets.length; ++i) {
  27.             buckets[i] = new ArrayList<>();
  28.         }
  30.         for (int i = 0; i < D; ++i) {
  31.             for (int x : nums) {
  32.                 final int index = getDigit(x - minValue, i);
  33.                 final ArrayList<Integer> bucket = buckets[index];
  34.                 bucket.add(x);
  35.             }
  37.             int index = 0;
  38.             for (ArrayList<Integer> bucket : buckets) {
  39.                 for (int x : bucket) {
  40.                     nums[index++] = x;
  41.                 }
  42.                 bucket.clear();
  43.             }
  44.         }
  45.     }
  47.     // get the i-th digit of n
  48.     private static int getDigit(int n, int i) {
  49.         for (int j = 0; j < i; ++j) {
  50.             n /= 10;
  51.         }
  52.         return n % 10;
  53.     }
  54. }

解法3 计数排序

计数排序本质上是一种特殊的桶排序,当桶的个数最大的时候,就是计数排序。

本题用计数排序会MLE。

  1. // Maximum Gap
  2. // Counting Sort
  3. // Time Complexity: O(n), Space Complexity: O(max-min)
  4. public class Solution {
  5.     public int maximumGap(int[] nums) {
  6.         if (nums.length < 2) return 0;
  7.         countingSort(nums);
  9.         int maxDiff = Integer.MIN_VALUE;
  10.         for (int i = 1; i < nums.length; ++i) {
  11.             maxDiff = Math.max(maxDiff, nums[i] - nums[i - 1]);
  12.         }
  13.         return maxDiff;
  14.     }
  15.     private static void countingSort(int[] nums) {
  16.         int minValue = Integer.MAX_VALUE;
  17.         int maxValue = Integer.MIN_VALUE;
  19.         for (int i : nums) {
  20.             minValue = Math.min(minValue, i);
  21.             maxValue = Math.max(maxValue, i);
  22.         }
  24.         final int[] buckets = new int[maxValue - minValue + 1];
  26.         for (int i : nums) {
  27.             buckets[i - minValue]++;
  28.         }
  30.         for (int i = 0, index = 0; i < buckets.length; ++i) {
  31.             Arrays.fill(nums, index, index + buckets[i], i + minValue);
  32.             index += buckets[i];
  33.         }
  34.     }
  35. }

原文: https://soulmachine.gitbooks.io/algorithm-essentials/content/java/sorting/radix-sort/maximum-gap.html