# Which row has the most 1s in a 0-1 matrix with all 1s "on the left"?

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)?

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

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.

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"
``````
• 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 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 Mar 29 '14 at 15:03

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           "
``````

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++;
}
``````
``````int [] getMax1withRow(int [][] matrix){
int [] result=new int;
int rows=matrix.length;
int cols=matrix.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=n;
result=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=max_one;
result=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.

• 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. Sep 4 '15 at 20:52