Search in a row wise and column wise sorted matrix [duplicate]

We have an n x n matrix, where every row and column is sorted in increasing order.

Given a number x, how to decide whether this x is in the matrix, better than O(n) complexity?

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• better than O(n) complexity? I don't think its possible. – Rishav Apr 6 '17 at 23:08
• What have you tried that doesn't work? – Gene Apr 6 '17 at 23:12
• @Gene I can do it O(n) just by simply search by rows and columns. – Aerin Apr 6 '17 at 23:14
• @Toussaint Louverture that aproach is O(N2) because for nXn matrix , rows =n and columns = n. For each row you traverse n column elements. – nits.kk Apr 7 '17 at 1:36
• @nits.kk But these are O(n) solutions. He's asking for better than O(n). – Gene Apr 7 '17 at 3:42

I think that just use binary search.

Time complexity of Binary search is O(log(n)).

So, in case n x n matrix, time complexity is O(log(n^2)) = O(2log(n)).

It is better than O(n).

-----(edit) / this is my cpp code.

``````#include<vector>
#include<iostream>
#include<cstdio>

using namespace std;

int n = 10;
vector<vector<int> > arr;
int search_cnt;

int _1to2(int x)
{
int row, col;

row = (x - 1) / n + 1;
if(x % n == 0)
col = n;
else
col = x % n;

return arr[row][col];
}

int _2to1(int row, int col)
{
return (row - 1) * n + col;
}

int binary(int find)
{
int low = 1, high = n*n, mid;

while(low <= high)
{
search_cnt++;
mid = (low + high) / 2;
if(_1to2(mid) > find)
high = mid - 1;
else if(_1to2(mid) < find)
low = mid + 1;
else
{
printf("search_cnt = %d, ", search_cnt);
return mid;
}
}

return -1;
}

int main()
{
int cnt = 1;
search_cnt = 0;

arr.resize(n+1);
for(int i = 0; i <= n; i++)
arr[i].resize(n+1);

for(int i = 1; i <= n; i++)
for(int j = 1; j <= n; j++)
arr[i][j] = cnt++;

for(int i = 1; i <= n*n; i++)
{
printf("searching pos = %d \n", binary(i));
search_cnt = 0;
}

return 0;
}
``````
• Binary search works on a total order. A 2d array with sorted rows and columns is not totally ordered. How are you going to use binary search? I'd like to see pseudocode. – Gene Apr 7 '17 at 3:40
• If matrix is ordered row to column and matrix cell start (1,1), I can think each cell (arr[y][x]) is 1d array ( arr[p], p = (x - 1) * n + y ). – jingbe Apr 7 '17 at 4:14