Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

If I have a sparse dataset where each data is described by a vector of 1000 elements, each element of this vector can be either 0 or 1 (a lot of 0 and some 1), do you know any distance function that could help me to cluster them ? Is something like euclidean distance convenient in this case ? I would like to know if there is a simple convenient distance metric for such a situation, to try on my data.

Thanks

share|improve this question
    
How about the distortion function used in K-meloids? It is not very different from Euclidean distance. –  Neo Dec 20 '11 at 8:48
    
@CRK K-meloids uses Minkowski distance with p = 1, which is a general case of euclidean distance, isn't it ? –  shn Dec 20 '11 at 9:02
add comment

3 Answers

up vote 1 down vote accepted

Have a look at distance functions used for sparse text vectors, such as Cosine Distance and for comparing sets, such as the Jaccard distance.

share|improve this answer
add comment

Your question doesn't have one answer. There are best-practices depending on the domain.

Once you decide on the similarity metric, the clustering is usually done by averaging or by finding a medoid. See these papers on clustering binary data for algorithm examples:

  • Carlos Ordonez. Clustering Binary Data Streams with K-means. PDF
  • Tao Li. A General Model for Clustering Binary Data. PDF

For ideas on similarity measures see this online "tool for measuring similarity between binary strings". They mention: Sokal-Michener, Jaccard, Russell-Rao, Hamann, Sorensen, antiDice, Sneath-Sokal, Rodger-Tanimoto, Ochiai, Yule, Anderberg, Kulczynski, Pearson's Phi, and Gower2, Dot Product, Cosine Coefficient, Hamming Distance. They also cite these papers:

  • Luke, B. T., Clustering Binary Objects
  • Lin, D., An Information-Theoretic Definition of Similarity.
  • Toit, du S.H.C.; Steyn, A.G.W.; Stumpf, R.H.; Graphical Exploratory Data Analysis; Chapter 3, p. 77, 1986; Springer-Verlag.

(I personally like the cosine. There is also KL-divergence, and its Jensen distance counterpart.)

share|improve this answer
    
Thanks for your answer, this is an interesting link. But, say we use the Hamming (or cosine or any other distance), how can we learn the representative of each group of vectors. I mean, let's say we have v1= 0100100001100 and v2 = 0001100001100, they are close to each other since they differ only in two bits (the 2nd and 3rd positions) then Hamming distance for example will be 2 (cosine will be 0.7500), the problem is: what will be the representative vector of v1 and v2 ? How to (learn) just the values of the vector that should represent v1 and v2 and all other vectors that are close to them. –  shn Dec 20 '11 at 16:05
1  
The representative vector is an average (centroid, not binary) or a medoid. Read the papers for examples on finding those. –  cyborg Dec 20 '11 at 17:31
add comment

If it really is lots of 0 and a few 1, you could try clustering for the first or last 1 - see http://aggregate.org/MAGIC/#Least Significant 1 Bit

share|improve this answer
    
First or last one ? How is the function metric between the two vectors defined in this case ? Distance(V1, V2) –  shn Dec 20 '11 at 8:57
add comment

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.