# k means clustering sample data

I am writing program to implement k-means clustering.

``````consider a simple input with 4 vertices a,b,c and d with following edge costs

[vertex1] [vertex2] [edge cost]
a b 1
a c 2
a d 3
b d 4
c d 5
``````

Now I need to make the program run until i get 2 clusters.

My doubt is, in the first step when calculate the minimum distance it is a->b (edge cost 1). Now I should consider ab as a single cluster. If that is the case, what will be the distance of ab from c and d?

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You might want to consider using k-Harmonic Means instead (a variant of k-Means that utilizes a different performance function), as it's less sensitive to the initial selection of cluster centers. –  Michael Dec 22 '12 at 16:32

The K-means algorithm works as follows:

1. choose k points as initial centroids (hence, K-*);
2. calculate the distance from all vertices to the k centroids choosen;
3. assign each vertex to the closest centroid;
4. recalculate the position of the centroids by generating the mean between all the vertices that belong to the centroid (hence, k-means, one mean calculation for each of the k centroids);
5. go to step `2` and stop when, in step `3`, no vertex get assigned to another centroid -- or until your error condition gets satisfied.

In your case, as you have an undirected graph, it'd be better for you to generate the coordinates of each vertex considering the edge distances, and then, apply the algorithm.

If you don't want to do this initial process, you may calculate the distance from a vertex to all other reachable vertices, but you'd have to do this for every iteration -- which is quite an unnecessary overhead.

``````[vertex1] [vertex2] [edge cost]
a b 1
a c 2
a d 3
b d 4
c d 5
``````

The table of distances would be something like:

``````     a    b    c    d
a    0    1    2    3
b    1    0   (1)   4
c    2   (1)   0    5
d    3    4    5    0

(1) - b to c = (b to a, a to c) = 3
``````

If this should be your table, simply apply the Dijkstra algorithm on your graph, for each vertex, and consider the resultant table your table of distances.

The table would have the minimal distances, but, if you have any other policy to calculate it, it's totally up to you saying how to calculate it.

Notice also that, if your graph is directed, the matrix will not be symmetric, as it is, in this case.

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if i calculate the distance from each vertex to other vertices and find the minimum . consider its (a,d) . then i should make a,d as a single cluster . Then what will be the distance for c to a,d and b to a,d.. (pls see my above example) –  srinath Dec 22 '12 at 16:17
@srinath that's not simply choosing minimal distance; k-means works as I've described: you choose k centroid positions, you assign each vertex to the closest centroid, and then recalculate the position of the centroid using the mean of the coordinates of each vertex assigned to this centroid. After that, you recalculate the distance of each vertex to the position of the new centroid -- repeating the process until it converges. –  Rubens Dec 22 '12 at 16:28