# Brute Force Algorithm for finding maximum independent vertex set in bipartite graph?

Does anyone know the the generic outline for the brute force algorithm for finding the maximum independent vertex set in a bipartite graph?

I know there are other algorithms such as König's Theorem for finding MIS, but I was wondering what the pseudocode for the brute force method would be?

In addition, what would be the run time complexity of such a brute force algorithm?

## 1 Answer

The brute force algorithm is just to iterate over all sets of vertices and check if they are independent. There are `2^n` sets of vertices and iterating over all edges to check for independence is `O(m)`, so this costs `O(2^n*m)`.

• What do the m and n represent, I assume m is the number of edges and n is the number of vertices? – user1084113 Sep 17 '12 at 3:00
• If there are `2^n` subsets, then `n` must be the number of vertices. The maximum value of `m` is `n * (n -1) / 2`, hence the complexity as a functions of number vertices becomes `O(2^n * n * (n-1)/2)` – fnisi Apr 13 '19 at 15:26