Subarray Sum K

Question

Problem Statement

Given an nonnegative integer array, find a subarray where the sum of numbers is k.
Your code should return the index of the first number and the index of the last number.

Example

Given [1, 4, 20, 3, 10, 5], sum k = 33, return [2, 4].

题解1 - 哈希表

Zero Sum Subarray 的升级版,这道题求子串和为 K 的索引。首先我们可以考虑使用时间复杂度相对较低的哈希表解决。前一道题的核心约束条件为 f(i_1) - f(i_2) = 0,这道题则变为 f(i_1) - f(i_2) = k, 那么相应的 index 则为 [i_1 + 1, i_2].

C++

  1. #include <iostream>
  2. #include <vector>
  3. #include <map>
  5. using namespace std;
  7. class Solution {
  8. public:
  9.     /**
  10.      * @param nums: A list of integers
  11.      * @return: A list of integers includes the index of the first number
  12.      *          and the index of the last number
  13.      */
  14.     vector<int> subarraySum(vector<int> nums, int k){
  15.         vector<int> result;
  16.         // curr_sum for the first item, index for the second item
  17.         // unordered_map<int, int> hash;
  18.         map<int, int> hash;
  19.         hash[0] = 0;
  21.         int curr_sum = 0;
  22.         for (int i = 0; i != nums.size(); ++i) {
  23.             curr_sum += nums[i];
  24.             if (hash.find(curr_sum - k) != hash.end()) {
  25.                 result.push_back(hash[curr_sum - k]);
  26.                 result.push_back(i);
  27.                 return result;
  28.             } else {
  29.                 hash[curr_sum] = i + 1;
  30.             }
  31.         }
  33.         return result;
  34.     }
  35. };
  37. int main(int argc, char *argv[])
  38. {
  39.     int int_array1[] = {1, 4, 20, 3, 10, 5};
  40.     int int_array2[] = {1, 4, 0, 0, 3, 10, 5};
  41.     vector<int> vec_array1;
  42.     vector<int> vec_array2;
  43.     for (int i = 0; i != sizeof(int_array1) / sizeof(int); ++i) {
  44.         vec_array1.push_back(int_array1[i]);
  45.     }
  46.     for (int i = 0; i != sizeof(int_array2) / sizeof(int); ++i) {
  47.         vec_array2.push_back(int_array2[i]);
  48.     }
  50.     Solution solution;
  51.     vector<int> result1 = solution.subarraySum(vec_array1, 33);
  52.     vector<int> result2 = solution.subarraySum(vec_array2, 7);
  54.     cout << "result1 = [" << result1[0] << " ," << result1[1] << "]" << endl;
  55.     cout << "result2 = [" << result2[0] << " ," << result2[1] << "]" << endl;
  57.     return 0;
  58. }

源码分析

与 Zero Sum Subarray 题的变化之处有两个地方,第一个是判断是否存在哈希表中时需要使用hash.find(curr_sum - k), 最终返回结果使用result.push_back(hash[curr_sum - k]);而不是result.push_back(hash[curr_sum]);

复杂度分析

略,见 Zero Sum Subarray

题解2 - 利用单调函数特性

不知道细心的你是否发现这道题的隐含条件——nonnegative integer array, 这也就意味着子串和函数 f(i) 为「单调不减」函数。单调函数在数学中可是重点研究的对象,那么如何将这种单调性引入本题中呢?不妨设 i_2 > i_1, 题中的解等价于寻找 f(i_2) - f(i_1) = k, 则必有 f(i_2) \geq k.

我们首先来举个实际例子帮助分析,以整数数组 {1, 4, 20, 3, 10, 5} 为例,要求子串和为33的索引值。首先我们可以构建如下表所示的子串和 f(i).

$$f(i)$$ 1 5 25 28 38
$$i$$ 0 1 2 3 4

要使部分子串和为33,则要求的第二个索引值必大于等于4,如果索引值再继续往后遍历,则所得的子串和必大于等于38,进而可以推断出索引0一定不是解。那现在怎么办咧?当然是把它扔掉啊!第一个索引值往后递推,直至小于33时又往后递推第二个索引值,于是乎这种技巧又可以认为是「两根指针」。

C++

  1. #include <iostream>
  2. #include <vector>
  3. #include <map>
  5. using namespace std;
  7. class Solution {
  8. public:
  9.     /**
  10.      * @param nums: A list of integers
  11.      * @return: A list of integers includes the index of the first number
  12.      *          and the index of the last number
  13.      */
  14.     vector<int> subarraySum2(vector<int> &nums, int k){
  15.         vector<int> result;
  17.         int left_index = 0, curr_sum = 0;
  18.         for (int i = 0; i != nums.size(); ++i) {
  19.             while (curr_sum > k) {
  20.                 curr_sum -= nums[left_index];
  21.                 ++left_index;
  22.             }
  24.             if (curr_sum == k) {
  25.                 result.push_back(left_index);
  26.                 result.push_back(i - 1);
  27.                 return result;
  28.             }
  29.             curr_sum += nums[i];
  30.         }
  31.         return result;
  32.     }
  33. };
  35. int main(int argc, char *argv[])
  36. {
  37.     int int_array1[] = {1, 4, 20, 3, 10, 5};
  38.     int int_array2[] = {1, 4, 0, 0, 3, 10, 5};
  39.     vector<int> vec_array1;
  40.     vector<int> vec_array2;
  41.     for (int i = 0; i != sizeof(int_array1) / sizeof(int); ++i) {
  42.         vec_array1.push_back(int_array1[i]);
  43.     }
  44.     for (int i = 0; i != sizeof(int_array2) / sizeof(int); ++i) {
  45.         vec_array2.push_back(int_array2[i]);
  46.     }
  48.     Solution solution;
  49.     vector<int> result1 = solution.subarraySum2(vec_array1, 33);
  50.     vector<int> result2 = solution.subarraySum2(vec_array2, 7);
  52.     cout << "result1 = [" << result1[0] << " ," << result1[1] << "]" << endl;
  53.     cout << "result2 = [" << result2[0] << " ," << result2[1] << "]" << endl;
  55.     return 0;
  56. }

源码分析

使用for循环, 在curr_sum > k时使用while递减curr_sum, 同时递增左边索引left_index, 最后累加curr_sum。如果顺序不对就会出现 bug, 原因在于判断子串和是否满足条件时在递增之后(谢谢 @glbrtchen 汇报 bug)。

复杂度分析

看似有两重循环,由于仅遍历一次数组,且索引最多挪动和数组等长的次数。故最终时间复杂度近似为 O(2n), 空间复杂度为 O(1).

Reference