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# Fuzzy c- means categorical data

Can the fuzzy c-means applied on non numerical data sets ? i.e categorical or mixed numerical and categorical.. if yes (I hope so :( ):

• how we calculate cluster centers ?

If NO , what is the alternative .. how to fuzzy clusters these data ?

NOTE: I've used the Jacard's coefficient to calculate the distance between 2 points but still didn't get the way to calculate the cluster centers see the attachements

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why is it non useful or non clear ? please tell me – AWRAM Oct 8 '11 at 18:21

You'll have to transform your data into a numeric form. There are various ways of doing that, two of them being:

• use vectors of feature counts (common in, e.g., text categorization)
• use a one-hot representation, where a categorical feature that can take on n distinct values is represented as string of n bits, with only the i'th bit set if a feature has the i'th value in its allowed range.

Both are very common transformations that many machine learning programs do under the hood. Also, you might want to experiment with a different metric than the Euclidean one. Esp. with one-hot representation, but depending on the data, the L1 norm (Manhattan/city block distance) may be more appropriate.

Apart from that, just apply the given formulas to your transformed dataset.

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thank u for ure answer, may u please check the updated question – AWRAM Oct 9 '11 at 17:17
@AWRAM: I don't think the Jaccard coefficient gives rise to a mean in the general case, so you'll want to switch to either a numeric representation or the k-medoids algorithm – Fred Foo Oct 10 '11 at 9:24
suppose that we transform features to binary representation e.g I have 3 points in a cluster A having each a membership value to this cluster as follow p1(1000,0.5(membership)) p2(0100,0.7) p3(0001,0.4). How to calculate the mean in this case ? – AWRAM Oct 11 '11 at 22:49
@AWRAM: features 1, 2 and 4 occur once in your set of three while feature 3 doesn't occur, so the unweighted mean is [1/3, 1/3, 0, 1/3]. The weighted case follows from this in the usual fashion. – Fred Foo Oct 12 '11 at 8:59
what could be the cluster center vj mentioned above ? – AWRAM Oct 12 '11 at 18:45