# Finding edge connectivity of a network by using Maximum Flow algorithm

I want to find the edge connectivity (i.e. minimum number of edges to remove to disconnect a graph) of an undirected graph using maximum flow algorithms (Edmond Karp / Ford-Fulkerson algorithms) ,

I know that I can accomplish this task by finding the minimum maximum flow between every two nodes of a graph , but this would result O(|V| ^ 2) number of flow networks ,

``````int Edge-Connectivity(Graph G){
int min = infinite;
for (Vertex u: G.V){
for (Vertex v: G.V){
if (u != v){
//create directed graph Guv (a graph with directed edges and source u and sink v)
//run Edmonds-Karp algorithm to find the maximum flow |f*|
if (min > |f*|)
min = |f*|;
}
}
}
return min;
}
``````

But I'd like to do this with |V| flow networks (running the max flow algorithm for only O(|V|) times) instead of O(|V| ^ 2) of them

-

Distinguish a node `v` in your graph. Compute, for every `w` other than `v`, the maximum flow from `v` to `w`. Since `v` must be on one shore of the graph's global minimum cut and something else must be on the other side, one of these flows will identify the global minimum cut.