LeetCode

2014.1.9 22:56

Given a triangle, find the minimum path sum from top to bottom. Each step you may move to adjacent numbers on the row below.

For example, given the following triangle

[
     [2],
    [3,4],
   [6,5,7],
  [4,1,8,3]
]

The minimum path sum from top to bottom is 11 (i.e., 2 + 3 + 5 + 1 = 11).

Note:
Bonus point if you are able to do this using only O(n) extra space, where n is the total number of rows in the triangle.

Solution:

　　First of all, you can't solve this problem with greedy strategy, i.e. choosing the smaller one on every branch you go down. It's dynamic programming.

　　Let f[i][j] be the minimum path sum you can get with a path ending at position (i, j). We have the following:

　　　　1. f[0][0] = a[0][0]; // You surely know a is an array, right?

　　　　2. f[i][i] = f[i - 1][i - 1] + a[i][i]; // i > 0

　　　　3. f[i][j] = min(f[i - 1][j - 1], f[i - 1][j]) + a[i][j]; // j > 0 && j < i

　　Time complexity is O(n^2). Space complexity is O(n). The recurrence relation indicates that the current row is only related to the previous row, thus the space needed is O(n), instead of O(n^2).

Accepted code:

 1 // 4CE, 2WA, 1AC, calm down~
 2 class Solution {
 3 public:
 4     int minimumTotal(vector<vector<int> > &triangle) {
 5         // IMPORTANT: Please reset any member data you declared, as
 6         // the same Solution instance will be reused for each test case.
 7         int n;
 8         vector<vector<int>> vv;
 9         int ff;
10         
11         n = triangle.size();
12         if(n == 0){
13             return 0;
14         }
15         
16         int i, j;
17         
18         for(i = 0; i < 2; ++i){
19             vv.push_back(vector<int>());
20             for(j = 0; j < n; ++j){
21                 vv[i].push_back(0);
22             }
23         }
24         
25         ff = 0;
26         vv[ff][0] = triangle[0][0];
27         for(i = 1; i < n; ++i){
28             vv[!ff][0] = vv[ff][0] + triangle[i][0];
29             for(j = 1; j < i; ++j){
30                 // 2WA here, wrong coding
31                 vv[!ff][j] = mymin(vv[ff][j - 1], vv[ff][j]) + triangle[i][j];
32             }
33             // 4CE here, foolish coding!!!
34             vv[!ff][i] = vv[ff][i - 1] + triangle[i][i];
35             ff = !ff;
36         }
37         
38         int res = vv[ff][0];
39         for(i = 1; i < n; ++i){
40             res = mymin(res, vv[ff][i]);
41         }
42         
43         vv[0].clear();
44         vv[1].clear();
45         vv.clear();
46         
47         return res;
48     }
49 private:
50     const int mymin(const int &x, const int &y) {
51         return (x < y ? x : y);
52     }
53 };