Question

I've got a solution here, it runs in a single pass, and does all processing "in place" with no extra memory (save for growing the stack).

It uses recursion to delay the writing of zeros which of course would destroy the matrix for the other rows and cols:

#include <iostream>

/**
* The idea with my algorithm is to delay the writing of zeros
* till all rows and cols can be processed. I do this using
* recursion:
* 1) Enter Recursive Function:
* 2) Check the row and col of this "corner" for zeros and store the results in bools
* 3) Send recursive function to the next corner
* 4) When the recursive function returns, use the data we stored in step 2
*       to zero the the row and col conditionally
*
* The corners I talk about are just how I ensure I hit all the row's a cols,
* I progress through the matrix from (0,0) to (1,1) to (2,2) and on to (n,n).
*
* For simplicities sake, I use ints instead of individual bits. But I never store
* anything but 0 or 1 so it's still fair ;)
*/

// ================================
// Using globals just to keep function
// call syntax as straight forward as possible
int n = 5;
int m[5][5] = {
                { 1, 0, 1, 1, 0 },
                { 0, 1, 1, 1, 0 },
                { 1, 1, 1, 1, 1 },
                { 1, 0, 1, 1, 1 },
                { 1, 1, 1, 1, 1 }
            };
// ================================

// Just declaring the function prototypes
void processMatrix();
void processCorner( int cornerIndex );
bool checkRow( int rowIndex );
bool checkCol( int colIndex );
void zeroRow( int rowIndex );
void zeroCol( int colIndex );
void printMatrix();

// This function primes the pump
void processMatrix() {
    processCorner( 0 );
}

// Step 1) This is the heart of my recursive algorithm
void processCorner( int cornerIndex ) {
    // // Step 2) Do the logic processing here and store the results
    bool rowZero = checkRow( cornerIndex );
    bool colZero = checkCol( cornerIndex );

    /// / Step 3) Now progress through the matrix
    int nextCorner = cornerIndex + 1;
    if( nextCorner < n )
        processCorner( nextCorner );

    // // Step 4) Finially apply the changes determined earlier
    if( colZero )
        zeroCol( cornerIndex );
    if( rowZero )
        zeroRow( cornerIndex );
}

// This function returns whether or not the row contains a zero
bool checkRow( int rowIndex ) {
    bool zero = false;
    for( int i=0; i<n && !zero; ++i ) {
        if( m[ rowIndex ][ i ] == 0 )
            zero = true;
    }
    return zero;
}

// This is just a helper function for zeroing a row
void zeroRow( int rowIndex ) {
    for( int i=0; i<n; ++i ) {
        m[ rowIndex ][ i ] = 0;
    }
}

// This function returns whether or not the col contains a zero
bool checkCol( int colIndex ) {
    bool zero = false;
    for( int i=0; i<n && !zero; ++i ) {
        if( m[ i ][ colIndex ] == 0 )
            zero = true;
    }

    return zero;
}

// This is just a helper function for zeroing a col
void zeroCol( int colIndex ) {
    for( int i=0; i<n; ++i ) {
        m[ i ][ colIndex ] = 0;
    }
}

// Just a helper function for printing our matrix to std::out
void printMatrix() {
    std::cout << std::endl;
    for( int y=0; y<n; ++y ) {
        for( int x=0; x<n; ++x ) {
            std::cout << m[y][x] << " ";
        }
        std::cout << std::endl;
    }
    std::cout << std::endl;
}

// Execute!
int main() {
    printMatrix();
    processMatrix();
    printMatrix();
}