This question already has an answer here:

I have some graph data, where the edges between nodes are on this form:

```
var edges = [
["A","B"], ["B","C"], ["B","D"], ["E","F"], ["E","G"]
];
```

What is the most efficient (running time) way to group the nodes that can reach each other? In my case:

```
[["A","B","C","D"],["E","F","G"]]
```

I am looking for a solution in pure javascript, or possibly by use of d3.js, underscore.js or jQuery. Pseudocode is also fine :)

**UPDATE:** Because some people have proposed this to be a duplicate of this question I will explain what I am using this for.

I have a number of 2D-points (probably less than 500) and I want to group points that are close to each other. First I do delaunay triangulation where I get a planar graph, I add the euclidean distance as weights on the edges and use Kruskal's algorithm to make a minimum spanning tree (MST). I remove all edges from the MST that are to long. Now I end up with a number of edges (as described above) that I want to process and find the clusters. When I have the clusters I will make convex hulls of them to visualize it.

So it is an undirected graph. The only thing an edge tells me, is that the two vertices it connects will be in the same cluster.

Even if the the number of points might be low, the running time is important, because this will be calculated on every mousemove.

**SOLUTION:** Thanks for the suggestions. For sake of completeness, here is the solution I came up with:

```
// Make a cluster for each vertex
var clusters = _.map(vertices, function(node) { return [node]; });
while(edges.length > 0) {
var edge = edges.pop();
var vertexA = edge[0],
vertexB = edge[1];
var cA = _.filter(clusters, function(cluster) {
return _.contains(cluster, vertexA);
});
var cB = _.filter(clusters, function(cluster) {
return _.contains(cluster, vertexB);
});
if(_.union(_.difference(cA,cB) , _.difference(cB,cA) ).length > 0) {
clusters = _.without(clusters, cA[0], cB[0]);
clusters.push(_.union(cA[0], cB[0]));
}
}
return clusters;
```