Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

There is this library that has implementations of many algorithms and one of them is maximum bipartite matching.

Here is the link to the source code: http://shygypsy.com/tools/bpm.cpp

I will include it here as well(without the comments)

#include <string.h>

#define M 128
#define N 128

bool graph[M][N];
bool seen[N];
int matchL[M], matchR[N];
int n, m;

bool bpm( int u )
  for( int v = 0; v < n; v++ ) 
   if( graph[u][v] )
    if( seen[v] ) continue;
    seen[v] = true;

    if( matchR[v] < 0 || bpm( matchR[v] ) )
        matchL[u] = v;
        matchR[v] = u;
        return true;
return false;

int main()
  memset( matchL, -1, sizeof( matchL ) );
  memset( matchR, -1, sizeof( matchR ) );
  int cnt = 0;
  for( int i = 0; i < m; i++ )
      memset( seen, 0, sizeof( seen ) );
      if( bpm( i ) ) cnt++;
  return 0;

We have a for loop that runs m times. The number m refers to the amount of workers. Then we enter the bpm function which has another for loop. This loop runs n times where n is the amount of tasks.

Until now we have m*n time complexity.

However there is a recursive function call of bpm in the third if statement. The goal of this function is to run a dfs in order to find an augmented path.

I know that dfs has a time complexity O(n+m). So I would assume that the function bpm has a complexity of O(n+m)

Thus the total time complexity would be O(m*(n+m))

However the author says it's O(m*n^2). Can someone explain me why is this the case? Thank you in advance!

share|improve this question
I'd note that O(m*(n+m)) == O(n*m^2), so is there any chance that you and the author have interchanged the symbols? –  Simon Mar 10 '13 at 19:36
If I understand correct, m is the number of workers and n the number of tasks, I was wrong about the time complexity of the DFS, what dfb said is most likely correct because O(mn + n + m) is the time complexity of the DFS and so the final complexity will be O(nmn + nn + nm) = O(mn^2) –  ksm001 Mar 10 '13 at 19:42

1 Answer 1

up vote 1 down vote accepted

The variables are somewhat confusing here: M and N refer to the number of nodes on each side of the graph. The runtime of DFS is O(E+V) where E is the number of edges. In a bipartite graph |E| is at most N*M and V will be (N+M), thus your DFS is going to take O(NM). The total time complexity is then O(NM^2). Not sure where the N^2 comes in, could be a typo...

share|improve this answer
thank you, I got a little confused with the DFS time complexity, your explanation makes sense to me. –  ksm001 Mar 10 '13 at 19:43

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.