LeetCode之“动态规划”：Minimum Path Sum && Unique Paths && Unique Paths II

　　之所以将这三道题放在一起，是因为这三道题非常类似。

　 1. Minimum Path Sum

　　题目链接

　　题目要求：

　　Given a m x n grid filled with non-negative numbers, find a path from top left to bottom right which minimizes the sum of all numbers along its path.

　　Note: You can only move either down or right at any point in time.

　　该题解答参考自一博文。

　　设dp[i][j]表示从左上角到grid[i][j]的最小路径和。那么dp[i][j] = grid[i][j] + min( dp[i-1][j], dp[i][j-1] );

　　下面的代码中，为了处理计算第一行和第一列的边界条件，我们令dp[i][j]表示从左上角到grid[i-1][j-1]的最小路径和，最后dp[rows][cols]是我们所求的结果

int minPathSum(vector<vector<int>>& grid) {
    int rows = grid.size();
    if(rows == 0)
        return 0;
    int cols = grid[0].size();
    
    vector<vector<int> > dp(rows + 1, vector<int>(cols + 1, INT_MAX));
    dp[0][1] = 0;
    for(int i = 1; i < rows + 1; i++)
        for(int j = 1; j < cols + 1; j++)
            dp[i][j] = grid[i - 1][j - 1] + min(dp[i][j - 1], dp[i - 1][j]);
    
    return dp[rows][cols];
}

　

　　注意到上面的代码中dp[i][j] 只和上一行的dp[i-1][j]和上一列的dp[i][j-1]有关，因此可以优化空间为O（n）（准确来讲空间复杂度可以是O（min（row,col）））

int minPathSum(vector<vector<int>>& grid) {
    int rows = grid.size();
    if(rows == 0)
        return 0;
    int cols = grid[0].size();

    vector<int> dp(cols + 1, INT_MAX);
    dp[1] = 0;
    for(int i = 1; i < rows + 1; i++)
        for(int j = 1; j < cols + 1; j++)
            dp[j] = grid[i-1][j-1] + min(dp[j-1], dp[j]);
    
    return dp[cols];
}

 　2. Unique Paths

 　  题目链接

　　题目要求：

　　A robot is located at the top-left corner of a m x n grid (marked 'Start' in the diagram below).

　　The robot can only move either down or right at any point in time. The robot is trying to reach the bottom-right corner of the grid (marked 'Finish' in the diagram below).

　　How many possible unique paths are there?

　　

　　Above is a 3 x 7 grid. How many possible unique paths are there?

　　Note: m and n will be at most 100.

　　这道题的解答跟上一道题是非常类似的，程序如下：

int uniquePaths(int m, int n) {
    if(m == 0 && n == 0)
        return 0;
    
    vector<vector<int> > dp(m, vector<int>(n, 1));
    for(int i = 1; i < m; i++)
        for(int j = 1; j < n; j++)
            dp[i][j] = dp[i-1][j] + dp[i][j-1];
    
    return dp[m-1][n-1];
}

　　优化空间程序：

int uniquePaths(int m, int n) {
    if(m == 0 && n == 0)
        return 0;

    vector<int> dp(n, 1);
    for(int i = 1; i < m; i++)
        for(int j = 1; j < n; j++)
            dp[j] = dp[j-1] + dp[j];
    
    return dp[n - 1];
}

　 3. Unique Paths II

　　题目链接

　　题目要求：

　　Follow up for "Unique Paths":

　　Now consider if some obstacles are added to the grids. How many unique paths would there be?

　　An obstacle and empty space is marked as 1 and 0 respectively in the grid.

　　For example,

　　There is one obstacle in the middle of a 3x3 grid as illustrated below.

[
  [0,0,0],
  [0,1,0],
  [0,0,0]
]　

　　The total number of unique paths is 2.

　　Note: m and n will be at most 100.

　　这道题跟上一道题基本一致，不同的地方在于我们需要将能到达存在obstacle的地方的路径数置为0。程序如下：

int uniquePathsWithObstacles(vector<vector<int>>& obstacleGrid) {
    int rows = obstacleGrid.size();
    if(rows == 0)
        return 0;
        
    int cols = obstacleGrid[0].size();
    if(cols == 0)
        return 0;
        
    vector<vector<int> > dp(rows, vector<int>(cols, 1));
    int i = 0;
    while(i < rows)
    {
        if(obstacleGrid[i][0] == 1)
            while(i < rows)
            {
                dp[i][0] = 0;
                i++;   
            }
        i++;
    }
    int j = 0;
    while(j < cols)
    {
        if(obstacleGrid[0][j] == 1)
            while(j < cols)
            {
                dp[0][j] = 0;
                j++;   
            }
        j++;
    }
    
    for(i = 1; i < rows; i++)
        for(j = 1; j < cols; j++)
        {
            if(obstacleGrid[i][j] == 1)
                dp[i][j] = 0;
            else
                dp[i][j] = dp[i-1][j] + dp[i][j-1];
        }

    return dp[rows-1][cols-1];
}