How to cluster time series data using K-means algorithm?

I am wondering how can I do clustering of time series data. I understand if the data is a point. But I do not know how to cluster if the data is time series with 1XM where M is the data length. Especially the part on how to compute new mean of the cluster for time series data.

My X matrix will be N X M where N is number of time series and M is data length as mentioned.

If i have a set of label time series , I want to use K mean algorithm to check whether I will get back the similar label or not.

Can someone guide me how to do it ?

for example using this k means matlab code. how do I modify so I can use it for time series data ? http://www.mathworks.cn/matlabcentral/fileexchange/19344-efficient-k-means-clustering-using-jit

Also, I wish to use different distance measure besides euclidean distance.

to Give better illustration of my doubt here is the code I modified for time series

===========================================

% Check if second input is centroids if ~isscalar(k) c=k; k=size(c,1); else c=X(ceil(rand(k,1)*n),:); % assign centroid randonly at start end

% allocating variables g0=ones(n,1);

gIdx=zeros(n,1); D=zeros(n,k);

% Main loop converge if previous partition is the same as current while

any(g0~=gIdx) %

disp(sum(g0~=gIdx))

g0=gIdx;

% Loop for each centroid

``````for t=1:k

%  d=zeros(n,1);

% Loop for each dimension

for s=1:n

D(s,t) = sqrt(sum((X(s,:)-c(t,:)).^2));
end
``````

end % Partition data to closest centroids

``````   [z,gIdx]=min(D,[],2);
% Update centroids using means of partitions

for t=1:k

c(t,:)=mean(X(gIdx==t,:));  % Is this how we calculate new mean of
``````

the time series?

end end

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Time series are usually high-dimensional. And you need specialized distance function to compare them for similarity. Plus, there might be outliers.

k-means is designed for low-dimensional spaces with a (meaningful) euclidean distance. It is not very robust towards outliers, as it puts squared weight on them.

Doesn't sound like a good idea to me to use k-means on time series data. Try looking into more modern, robust clustering algorithms. Many will allow you to use arbitrary distance functions, including time series distances such as DTW.

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could you please suggest some of the robust clustering algorithms. and what is DTW? thanks. –  samkhan13 Jun 9 '13 at 18:50
Grab any book on time series, and it will teach you DTW. Or google for "time series DTW". It's state of the art. As for clustering, look up DBSCAN and OPTICS on Wikipedia. They can be used with DTW, k-means cannot. –  Anony-Mousse Jun 9 '13 at 22:19
thanks this helps :) –  samkhan13 Jun 10 '13 at 5:44

It's probably too late for an answer, but:

The methods above use R. You'll find more methods by looking, e.g., for "Iterative Incremental Clustering of Time Series".

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If you did really want to use clustering, then dependent on your application you could generate a low dimensional feature vector for each time series. For example, use time series mean, standard deviation, dominant frequency from a Fourier transform etc. This would be suitable for use with k-means, but whether it would give you useful results is dependent on your specific application and the content of your time series.

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