28

Problem

Each row of an n x n matrix consists of 1's and 0's such that in any row, all 1's come before any 0's. Find row containing most no of 1's in O(n).

Example

1 1 1 1 1 0  <- Contains maximum number of 1s, return index 1
1 1 1 0 0 0
1 0 0 0 0 0
1 1 1 1 0 0
1 1 1 1 0 0
1 1 0 0 0 0

I found this question in my algorithms book. The best I could do took O(n logn) time. How to do this in O(n)?

2
  • 2
    What is n here? Number of rows? Number of coloumns? Number of cells?
    – MAK
    Mar 22 '11 at 8:39
  • 3
    The question states n x n, so n is both columns and rows.
    – Assaf Levy
    Mar 22 '11 at 9:39
42

Start at 1,1.

If the cell contains 1, you're on the longest row so far; write it down and go right. If the cell contains 0, go down. If the cell is out of bounds, you're done.

13

You can do it in O(N) as follows:

Start at A[i][j] with i=j=0.

          1, keep moving to the right by doing j++
A[i][j] = 
          0, move down to the next row by doing i++

When you reach the last row or the last column, the value of j will be the answer.

Pseudo code:

Let R be number of rows
Let C be number of columns

Let i = 0
Let j = 0   
Let max1Row = 0

while ( i<R && j<C )
   if ( matrix[i][j] == 1 )
      j++
      max1Row = i
   else
      i++
end-while


print "Max 1's = j"
print "Row number with max 1's = max1Row"
4
  • This is wrong...what if your first cell [0, 0] contains a 0 and the rest cells in that row contains all 1. And all the rest of the cell in the subsequent rows contain only 0. Then you answer would be i where i is the maximum row number and j would be 0. Mar 22 '11 at 8:57
  • @Swaranga Sarma: You need to read the question carefully all 1's come before any 0's
    – codaddict
    Mar 22 '11 at 9:00
  • The code seems incorrect specially "if ( matrix[i][j] == 1 ) j++ max1Row = i" part. You are not keeping track of the row-number with the maximum number of 1 Mar 22 '11 at 16:35
  • It would be good if we start from right to left rather than travelling from left to right so that we can skip most of rows if it ends with 0
    – Viswesn
    Mar 29 '14 at 15:03
2

Start with the first row. Keep the row R that has the most numbers of 1s and the index i of the last 1 of R. in each iteration compare the current row with the row R on the index i. if the current row has a 0 on position i, the row R is still the answer. Otherwise, return the index of the current row. Now we just have to find the last 1 of the current row. Iterate from index i up to the last 1 of the current row, set R to this row and i to this new index.

              i
              |  
              v 
R->   1 1 1 1 1 0  
|
v     1 1 1 0 0 0 (Compare ith index of this row)
      1 0 0 0 0 0         Repeat
      1 1 1 1 0 0           "
      1 1 1 1 0 0           "
      1 1 0 0 0 0           "
0

Some C code to do this.

int n = 6;
int maxones = 0, maxrow = -1, row = 0, col = 0;
while(row < n) {
    while(col < n && matrix[row][col] == 1) col++;
    if(col == n) return row;
    if(col > maxones){
        maxrow = row;
        maxones = col;
    }
    row++;
}
0
int [] getMax1withRow(int [][] matrix){
    int [] result=new int[2];
    int rows=matrix.length;
    int cols=matrix[0].length;
    int i=0, j=0;
    int max_row=0;// This will show row with maximum 1. Intialing pointing to 0th row.
    int max_one=0;// max one
    while(i< rows){
        while(matrix[i][j]==1){
            j++;
        }
        if(j==n){
             result[0]=n;
             result[1]=i;
             return result;
        }
        if(j>max_one){
             max_one=j;
             max_row=i;
        }
        j=0;// Again start from the first column
        i++;// increase row number
    }
    result[0]=max_one;
    result[1]=max_row;
    return result;
}

Time complexity => O(row+col), In worse case If every row has n-1 one except last row which have n 1s then we have be travel till last row.

1
  • Your time complexity is O(n^2) because j=0;// Again start from the first column. The whole point of Thom's answer is that you don't have to go back to the beginning of the row because you know that if the next row doesn't have a 1 in the current column, it can't be the row with the most 1's.
    – beaker
    Sep 4 '15 at 20:52

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