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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!

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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...

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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

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