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I want some guidance here. I've just been trying to normalize the TF-IDF results for my project. So, I am thinking ahead what's next after TF-IDF? I wanted to do k-means clustering onto those normalized TF-IDF but is it the time already? before this I created the index with Lucene, and if possible I don't want to use Mahout, because I'm using Windows (don't want to use cygwin either).

Any suggestion on what (and how) to do k-means with these lucene-ed and tf-idf-ed results? I'm lost here..

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what exactly do you want to achieve. cluster the results ? or something else ? –  phoxis Jul 1 '12 at 11:28
Yes I want to cluster the results. then the results should be in clusters where we can view them by selecting the cluster no. any code examples or links on how can I do that? –  John Jul 2 '12 at 16:12

1 Answer 1

You need to look into '''spherical k-means''', as:

  • regular k-means is tied to Euclidean distance
  • regular k-means does not work well for high-dimensional sparse data
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all right, I want to make this clear; I just want to use the original k-means lloyd algorithm, so, right now I want your help to suggest how can I get the clustering results. cuz right now I was told by my lacturer that I can directly use the un-normalized TF-IDF to do clustering but I don't know hoe to apply it.. I already got the double[][]matrix var up... guys please show me the way... I'm lost –  John Jul 4 '12 at 16:45
Why don't you ask your lecturer then? I mean, you can use anything. You can apply k-means to 0 vectors. The result just won't be too useful IMHO. –  Anony-Mousse Jul 4 '12 at 17:36
You can try k-means with non-euclidean distances. It will run, but it might not converge but chase its tail. You can apply it to binary data, but you then shouldn't be surprised to see non-binary centers and many clusters become empty. And you can apply it to high-dimensional data such as TF-IDF vectors, ignoring the well-known curse of dimensionality. –  Anony-Mousse Jul 4 '12 at 22:07
oh, so do you mean that euclidean distance need normalized vectors? cause you're suggesting me to try with non-euclidean distance.. But I thought that's the most famous distance measurement for original kmeans? thanks for replying though. –  John Jul 5 '12 at 7:58
No. Euclidean distance needs geometric spaces. It is known to not work well for high-dimensional data. And it is the distance that k-means was designed for. For other distance functions the mean is likely not optimizing the variances, so it might not converge (so you shouldn't use other distances!). Ask your lecturer about k-means and other distances! –  Anony-Mousse Jul 5 '12 at 8:42

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