dp[row - 1][col - 1] 表示从 [0][0] 到 [row-1][col-1] 位置上加起来的最小的和。所以dp递推公式如下:
- dp[x,y] = grid[x][y] + max{ dp[x-1][y], dp[x][y-1] } , x>=1, y>=1
- dp[0][0] = grid[0][0]
- dp[0][y] = dp[0][y-1] + grid[0][y], y>=1
- dp[x][0] = dp[x-1][0] + grid[x][0], x>=1
最后的结果就是:dp[row-1][col-1]
class Solution {
public:
int minPathSum(vector<vector<int>>& grid) {
int row = (int)grid.size();
if (row == 0)
{
return 0;
}
int col = (int)( grid[0].size() );
if (col == 0)
{
return 0;
}
// make sure row >= 1 && col >= 1
for (int i = 1; i < col; i++)
{
(grid[0])[i] = (grid[0])[i - 1] + (grid[0])[i];
}
for (int i = 1; i < row; i++)
{
(grid[i])[0] = (grid[i-1])[0] + (grid[i])[0];
}
for (int i = 1; i < row; i++)
{
for (int j = 1; j < col; j++)
{
(grid[i])[j] = (grid[i])[j] + min(grid[i-1][j], grid[i][j-1]);
}
}
return grid[row-1][col-1];
}
};
