clustering for trajectories

I have large amount of temporal lat/lon.

I'm trying to find k-clusters of trajectories from this data. What is the best approach for this?

Thanks.

Edit:

How should I generate the features for my data (lat/lon + time) in order to use kmeans / hierarchical clustering?

Edit:

Hopefully this will make it clearer

Here's an example of how my data look:

Trajectory 1:

lat1,lon1 at time1
lat2,lon2 at time2
...
lat55,lon55 at time55

Trajectory 2:

lat343,lon343 at time343
lat344,lon344 at time344
...
lat376,lon376 at time376


And on and on (couple more trajectories).

So say I have 200 of these trajectories, I want to cluster them into 2 groups. How should I approach this?

Should I use kmeans/HAC for this or should I look at another method?

Edit:

The goal of this is to classify the trajectories into k clusters which represent k different directions of the trajectories.

Simply, I am just trying to cluster the trajectories into groups of different directions. I am not worried about their distances similarities.

So say the end I want to find something like this:

Direction 1:
Trajectory 4
Trajectory 5
Trajectory 7

Direction 2:
Trajectory 44
Trajectory 2
Trajectory 27


...

Direction 10:
Trajectory 17
Trajectory 8


Note: The shapes of the trajectories are mostly lines (not straight-lines), some are looped.
Note: The lat/lon are super local to one region, so I can use a flat-earth approximation.

The directions are intended to be very coarse. How do I compute similarity between trajectories to cluster them to achieve this?

Edit:

Here is an illustration (to the best of my abilities):

I want to separate the trajectories into the directions as such.

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I'm not getting your point here exactly.. is what you are asking for is feature extraction? if so, then it has nothing to do with clustering. –  mamdouh alramadan Feb 26 '13 at 23:41
No, I'm not asking about feature extraction. I'm asking about how to cluster trajectories given lat/lon + time for each lat/lon. Say that I know the number of clusters to be 2, how would I cluster the trajectories into 2 clusters? I can't do something naive like using end lat/lon and subtracting the beginning lat/lon. –  kietdlam Feb 26 '13 at 23:59
OK, I'm not 100% sure here because the case is not that clear to me (anyway it's hard to describe a case of DM within a couple of lines). but have you tried k-means for those three dimensions you mentioned (lat/lon + time). euclidean distance would help you to process the k-means with centroids and everything else.. Am I closer to your point now? –  mamdouh alramadan Feb 27 '13 at 0:09
@mamdouhalramadan: Hopefully my edit should make it clearer –  kietdlam Feb 27 '13 at 0:29
@ktklam9: What are you trying to use these data to determine? A simple density raster (computed using IDW or Kriging) would be a simple approximation, or consider constructing a vector field, clustered into grid cells. (Aside: are those airborne particle trajectories? I gave a talk last year at the AMS conference about analyzing just such a dataset.) –  Daniel Pryden Feb 27 '13 at 6:22

K-means is designed around minimizing variance.

When you apply it to longitudinal data, you get some error unless you are always close to the equator and stay away from the 180 meridian. Because the earth is approximately a sphere surface, not an infinite euclidean vector space.

Try a distance or density based clustering algorithm instead that can use great-circle distance, for example. Hierarchical clustering may be a better choice than k-means, too.

Great-circle distance is just between two points. So the next thing for you to do is to figure out how to combine these distances and the temporal component into an appopriate similarity measure for your trajectories. This is quite usage dependant, and there is no universal solution that we could share with you. The better your similarity function, the better your clustering results!

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I'm not sure what you're trying to get at. I am not clustering purely lat/lon data. I'm trying to cluster the trajectories into k-clusters given by the lat/lon + a time component. –  kietdlam Feb 26 '13 at 23:36
Yes, and are the clusters meaningful, given that k-means does not understand "latitude", "longitude", "time" and their relationship? See, it assumes an euclidean vector space. But the earth surface is approximately a sphere surface. –  Anony-Mousse Feb 27 '13 at 6:50
I see why you are concerned about using kmeans for lat/lon. I still dont think it matters because the lat/lon are super local to one region, so I can assume a flat-earth approximation. –  kietdlam Feb 27 '13 at 12:44
Well, doesn't hold for me, I have data sets that contain Alaska. Furthermore, in Europe the distortion is already like 1/3 - flat earth is a really bad approximation. Equirectangular is easy to use, but about the worst map projection you can choose. It preserves neither angles nor distances nor area. –  Anony-Mousse Feb 27 '13 at 13:52
So say even if I don't use a flat-earth approximation, why can't I use k-means? I can transform the lat/lon into cartesian coordinates (x,y,z) and use that. But again, I doubt this or your suggestion will help in clustering the trajectories. –  kietdlam Feb 27 '13 at 14:22

The way you describe the problem it sounds as if you can represent all trajectories as an angle relative to the equator. It then comes down to segmenting; this is not really clustering; see e.g. https://en.wikipedia.org/wiki/Jenks_natural_breaks_optimization. In your case the values would loop around, so it would be segmenting values on a circle (using degrees/angles) rather than on a straight line. Of course, if this describes your problem, it also provides a good way of visualising it.

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No, I cannot represent the trajectories as an angle because they are not straight-lines. It is not clear how I would use the Jenks natural breaks optimization on my data. Can you explain further? –  kietdlam Feb 27 '13 at 19:28
Well, you write "The directions are intended to be very coarse. So Direction 1 could be like North to South, while Direction 2 could be from South to North etc...". This is certainly representable as a straight line / angle. I understand this describes your desired outcome, but it seems logical to then abstract your input to the same level. If you do not want to compress the input to such a crude representation, then the question arises: How do you compute similarity between trajectories? That seems to be the crux of the problem. –  micans Feb 28 '13 at 0:43
Yes you are right, sorry for the confusion –  kietdlam Feb 28 '13 at 5:13

Dynamic time warping (DTW) produces a similarity metric that is typically used with time-series data (which is what you have). You can then use these DTW similarities as input to any of a number of similarity-based clustering algorithms.

For your dataset, I would extract sequences of orientations only because including the distance component could lead to problems if paths are traversed at different speeds or if samples are taken at heterogeneous time intervals.

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Thanks for the suggestion, will look into it :) –  kietdlam Mar 1 '13 at 22:09