矩阵区域和
给你一个 m x n 的矩阵 mat 和一个整数 k ,请你返回一个矩阵 answer ,其中每个 answer[i][j] 是所有满足下述条件的元素 mat[r][c] 的和:
i - k <= r <= i + k,j - k <= c <= j + k 且(r, c) 在矩阵内。
示例 1:
输入:mat = [[1,2,3],[4,5,6],[7,8,9]], k = 1
输出:[[12,21,16],[27,45,33],[24,39,28]]
示例 2:
输入:mat = [[1,2,3],[4,5,6],[7,8,9]], k = 2
输出:[[45,45,45],[45,45,45],[45,45,45]]
提示:
m == mat.length n == mat[i].length 1 <= m, n, k <= 100 1 <= mat[i][j] <= 100
解题思路:
dp[i+1][j+1] = dp[i][j+1]+dp[i+1][j]+arr[i][j]-dp[i][j];
根据前缀矩阵计算结果:
解题代码如下所示:
复杂度
O(M * N)O(M * N)题解代码如下(代码中有详细的注释说明):
class Solution {
public int[][] matrixBlockSum(int[][] mat, int k) {
int m = mat.length,n = mat[0].length;
int[][] dp = get_dp(mat,m,n);
return get_res(dp,m,n,k);
}
//获取dp数组
public int[][] get_dp(int[][] arr,int m,int n){
int[][] dp = new int[m+1][n+1];
for (int i = 0; i < m; i++)
for (int j = 0; j < n; j++)
dp[i+1][j+1] = dp[i][j+1]+dp[i+1][j]+arr[i][j]-dp[i][j];
return dp;
}
//获取结果
public int[][] get_res(int[][] dp,int m,int n,int k){
int[][] res = new int[m][n];
int x1,y1,x2,y2;
for (int i = 0; i < m; i++) {
for (int j = 0; j < n; j++) {
x1 = Math.max(0,i-k);y1 = Math.max(0,j-k);
x2 = Math.min(m,i+k+1);y2 = Math.min(n,j+k+1);
res[i][j] = dp[x2][y2]-dp[x1][y2]-dp[x2][y1]+dp[x1][y1];
}
}
return res;
}
}提交后反馈结果(由于该题目没有进行优化,性能一般):
