0304. 二维区域和检索 - 矩阵不可变【中等】
1. 📝 题目描述
给定一个二维矩阵 matrix,以下类型的多个请求:
- 计算其子矩形范围内元素的总和,该子矩阵的 左上角 为
(row1, col1),右下角 为(row2, col2)。
实现 NumMatrix 类:
NumMatrix(int[][] matrix)给定整数矩阵matrix进行初始化int sumRegion(int row1, int col1, int row2, int col2)返回 左上角(row1, col1)、右下角(row2, col2)所描述的子矩阵的元素 总和。
示例 1:

txt
输入:
["NumMatrix","sumRegion","sumRegion","sumRegion"]
[
[
[
[3,0,1,4,2],
[5,6,3,2,1],
[1,2,0,1,5],
[4,1,0,1,7],
[1,0,3,0,5]
]
],
[2,1,4,3],
[1,1,2,2],
[1,2,2,4]
]
输出:
[null, 8, 11, 12]
解释:
NumMatrix numMatrix = new NumMatrix([
[3,0,1,4,2],
[5,6,3,2,1],
[1,2,0,1,5],
[4,1,0,1,7],
[1,0,3,0,5]
]);
numMatrix.sumRegion(2, 1, 4, 3); // return 8 (红色矩形框的元素总和)
numMatrix.sumRegion(1, 1, 2, 2); // return 11 (绿色矩形框的元素总和)
numMatrix.sumRegion(1, 2, 2, 4); // return 12 (蓝色矩形框的元素总和)1
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提示:
m == matrix.lengthn == matrix[i].length1 <= m, n <= 200-10^5 <= matrix[i][j] <= 10^50 <= row1 <= row2 < m0 <= col1 <= col2 < n- 最多调用
10^4次sumRegion方法
2. 🎯 s.1 - 二维前缀和
c
typedef struct {
int** prefix;
int m, n;
} NumMatrix;
NumMatrix* numMatrixCreate(int** matrix, int matrixSize, int* matrixColSize) {
NumMatrix* obj = (NumMatrix*)malloc(sizeof(NumMatrix));
int m = matrixSize, n = matrixColSize[0];
obj->m = m; obj->n = n;
obj->prefix = (int**)malloc(sizeof(int*) * (m + 1));
for (int i = 0; i <= m; i++) {
obj->prefix[i] = (int*)calloc(n + 1, sizeof(int));
}
for (int i = 1; i <= m; i++) {
for (int j = 1; j <= n; j++) {
obj->prefix[i][j] = matrix[i - 1][j - 1] + obj->prefix[i - 1][j] + obj->prefix[i][j - 1] - obj->prefix[i - 1][j - 1];
}
}
return obj;
}
int numMatrixSumRegion(NumMatrix* obj, int row1, int col1, int row2, int col2) {
return obj->prefix[row2 + 1][col2 + 1] - obj->prefix[row1][col2 + 1] - obj->prefix[row2 + 1][col1] + obj->prefix[row1][col1];
}
void numMatrixFree(NumMatrix* obj) {
for (int i = 0; i <= obj->m; i++) free(obj->prefix[i]);
free(obj->prefix);
free(obj);
}1
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js
/**
* @param {number[][]} matrix
*/
var NumMatrix = function (matrix) {
const m = matrix.length,
n = matrix[0].length
this.prefix = Array.from({ length: m + 1 }, () => new Array(n + 1).fill(0))
for (let i = 1; i <= m; i++) {
for (let j = 1; j <= n; j++) {
this.prefix[i][j] =
matrix[i - 1][j - 1] +
this.prefix[i - 1][j] +
this.prefix[i][j - 1] -
this.prefix[i - 1][j - 1]
}
}
}
/**
* @param {number} row1
* @param {number} col1
* @param {number} row2
* @param {number} col2
* @return {number}
*/
NumMatrix.prototype.sumRegion = function (row1, col1, row2, col2) {
return (
this.prefix[row2 + 1][col2 + 1] -
this.prefix[row1][col2 + 1] -
this.prefix[row2 + 1][col1] +
this.prefix[row1][col1]
)
}1
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py
class NumMatrix:
def __init__(self, matrix: List[List[int]]):
m, n = len(matrix), len(matrix[0])
self.prefix = [[0] * (n + 1) for _ in range(m + 1)]
for i in range(1, m + 1):
for j in range(1, n + 1):
self.prefix[i][j] = matrix[i - 1][j - 1] + self.prefix[i - 1][j] + self.prefix[i][j - 1] - self.prefix[i - 1][j - 1]
def sumRegion(self, row1: int, col1: int, row2: int, col2: int) -> int:
return self.prefix[row2 + 1][col2 + 1] - self.prefix[row1][col2 + 1] - self.prefix[row2 + 1][col1] + self.prefix[row1][col1]1
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- 时间复杂度:初始化
,查询 - 空间复杂度:
,前缀和数组
算法思路:
- 预处理二维前缀和数组,
表示左上角 到 的元素总和 - 查询时利用容斥原理: