LeetCode 74:Search a 2D Matrix

Write an efficient algorithm that searches for a value in an m x n matrix. This matrix has the following properties:

Integers in each row are sorted from left to right.
The first integer of each row is greater than the last integer of the previous row.

For example,

Consider the following matrix:

[
  [1,   3,  5,  7],
  [10, 11, 16, 20],
  [23, 30, 34, 50]
]

Given target = 3, return true.

Subscribe to see which companies asked this question

方法一：

1.先在全部行中利用二分查找target所在行；

2.然后target所在行进行二分查找target

 class Solution {
 public:
	 bool searchMatrix(vector<vector<int>>& matrix, int target) {
		 if (matrix.size() == 0)     return false;
		 if (matrix[0][0] > target)  return false;
		 int r = matrix.size(), c = matrix[0].size(); //r,c分别为矩阵matrix的行数和列数
		 int low = 0, high = r-1;

		 //在全部行中利用二分查找target所在的行
		while(low <= high)
		 {
			 int mid = low + (high-low) / 2;
			 if (matrix[mid][0] == target)
				 return true;
			 else if (matrix[mid][0] < target)
				 low = mid + 1;
			 else
				 high = mid - 1;
		 }

		//在target所在行中利用二分查找target
		int low1 = 0, high1 = c - 1;
		int k = 0;
		while (low1 <= high1)
		{
			int mid1 = low1 + (high1 - low1)/2;
			if (matrix[low-1][mid1] == target) //注意target所在的行是(low-1)
				return true;
			else if (matrix[low-1][mid1] < target)
				low1 = mid1 + 1;
			else
				high1 = mid1 - 1;

			k = mid1;
		}
		
		if (matrix[low-1][k] == target) 
			return true;
		else
			return false;
	 }
 };

方法二：将矩阵看成数组,利用二分查找。执行时间12ms,时间复杂度O(log(mn))，将m*n的矩阵看成数组，即matrix[x][y]=>a[x*n+y]。数组也能够转回m*n矩阵。即a[x]=>matrix[x/n][x%n]

注：此方法为參考leetcode solution中的C++ 12ms方法

//方法二：
 //将矩阵看成数组,利用二分查找，执行时间12ms,时间复杂度O(log(mn))
 //将m*n的矩阵看成数组，即matrix[x][y]=>a[x*n+y]
 //数组也能够转回m*n矩阵。即a[x]=>matrix[x/n][x%n]
 class Solution {
 public:
	 bool searchMatrix(vector<vector<int>>& matrix, int target) {
		 if (matrix.empty())  return false;
		 int m = matrix.size(), n = matrix[0].size();
		 int low = 0, high = m*n - 1;

		 while (low<=high)
		 {
			 int mid = low + (high - low) / 2;
			 int value = matrix[mid / n][mid%n];
			 if (value == target)
				 return true;
			 else if (value < target)
				 low = mid + 1;
			 else
				 high = mid - 1;
		 }
		 return false;
	 }
 };

測试代码：

#include<iostream>
#include<vector>
#include<algorithm>
using namespace std;

 class Solution {
 public:
	 bool searchMatrix(vector<vector<int>>& matrix, int target) {
		 if (matrix.size() == 0)     return false;
		 if (matrix[0][0] > target)  return false;
		 int r = matrix.size(), c = matrix[0].size(); //r,c分别为矩阵matrix的行数和列数
		 int low = 0, high = r-1;

		 //在全部行中利用二分查找target所在的行
		while(low <= high)
		 {
			 int mid = low + (high-low) / 2;
			 if (matrix[mid][0] == target)
				 return true;
			 else if (matrix[mid][0] < target)
				 low = mid + 1;
			 else
				 high = mid - 1;
		 }

		//在target所在行中利用二分查找target
		int low1 = 0, high1 = c - 1;
		int k = 0;
		while (low1 <= high1)
		{
			int mid1 = low1 + (high1 - low1)/2;
			if (matrix[low-1][mid1] == target) //注意target所在的行是(low-1)
				return true;
			else if (matrix[low-1][mid1] < target)
				low1 = mid1 + 1;
			else
				high1 = mid1 - 1;

			k = mid1;
		}
		
		if (matrix[low-1][k] == target) 
			return true;
		else
			return false;
	 }
 };


int main()
{
	Solution s;
	vector<vector<int>> nums1 = { { 1, 3, 5, 7 }, { 10, 11, 16, 20 }, {23,30,34,50} };
	bool  t = s.searchMatrix(nums1, 11);
	cout << t <<endl;
	system("pause");
	return 0;
}