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Currently, I have 6 curves shown in 6 different colors as below. enter image description here The 6 curves are in fact generated by 6 trials of one same experiment. That means, ideally they should be the same curve, but due to the noise and different trial participants, they just look similar but not exactly the same.

Now I wish to create an algorithm that is able to identify that the 6 curves are essentially the same and cluster them together into one cluster. What similarity metrics should I use?


  1. The x-axis does NOT matter at all! I simply align them together for visual purpose. Thus, feel free to left/right shift the curves, if doing so helps.
  2. "Sub-curves" that are part of the curves may appear. The "belongingness" is important and thus needs identifying as well. But again, left/right shifting is allowed.

I have attemped to learn some of the clustering algorithm, such as DBSCAN, K-means, Fuzzy C-means, etc. But I don't see their appropriateness in this case, because the "belongingness" needs to be spotted!

Any suggestions or comments are well welcomed. I understand that it is hard to give some exact solutions to this question. I am only expecting some enlightening suggestions here.

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If you discretize along x, you get a vector of values that you can use with Euclidean distance (or any other standard metric). –  larsmans Sep 17 '13 at 11:44
This question might be helpful : stackoverflow.com/questions/18820814/… –  kudkudak Sep 17 '13 at 12:27
@larsmans sorry I didn't get it. Could you elaborate? –  Sibbs Gambling Sep 17 '13 at 13:09

1 Answer 1

up vote 2 down vote accepted

Have a look at time series similarity functions, such as dynamic time warping.

They can be used with e.g. DBSCAN but NOT with k-means (you cannot compute a reasonable "mean" for these distances; k-means is really designed for squared Euclidean distances).

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DTW is a really really awesome suggestion here! –  Sibbs Gambling Sep 18 '13 at 2:26
Enlightened by your answer, I have tried DTW but encountered with the following question. Could you please further take a look and help? stackoverflow.com/questions/18887200/… –  Sibbs Gambling Sep 19 '13 at 6:04

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