# What's the best method to compare original trajectory with two compressed trajectory

Suppose to have a GPS trajectory - i.e.: a series of spatio-temporal coords, every coord is a (x,y,t) information, where x is longitude, y is latitude and t is the time stamp. Suppose each trajectory identified by 1000 (x,y) points, a compressed trajectory is trajectory with fewer points than the original, for instance 300 points. A compression algorithm (Douglas-Peucker, Bellman, etc) decide what points will be in compressed trajectory and what point will be discarded.

Each algorithm make his own choice. Better algorithms choice the points not only by spatial characteristics (x, y) but using spatio-temporal characteristics (x,y,t).

Now I need a way to compare two compressed trajectories against the original to understand what compression algorithm better reduce a spatio-temporal (temporal component is really important) trajectory.

I've thinked of DTW algorithm to check trajectory similarity, but this probably don't care about temporal component. What algorithm can I use to make this control?

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What do you mean by compressed trajectory? –  ElKamina Jan 23 '12 at 23:36
Can you please update this question to contain more information about what a "compressed trajectory" is? I feel that most people on this site (including me) will not know what this is. –  templatetypedef Jan 24 '12 at 3:12
I'm sorry. Hope that this helps. –  marianoc84 Jan 24 '12 at 7:22

What is the best compression algorithm depends to a large extent on what you are trying to achieve with it, and is dependent on other external variables. Typically, were going to identify and remove spikes, and then remove redundant data. For example;

Known minimum and maximum velocity, acceleration, and ability to tuen will let you remove spikes. If we look at the join distance between a pair of points divided by the time where

velocity = sqrt((xb - xa)^2 + (yb - ya))/(tb-ta)

we can eliminate points where the distance couldn't be travelled in the elapsed time given the speed constraint. We can do the same with acceleration constraints, and change in direction constraints for a given velocity. These constraints change whether the GPS receiver is static, hand held, in a car, in an aeroplane etc...

We can remove redundant points using a moving window looking at three points, where if the an interpolated (x,y,t) for middle point can be compared with an observed point, and the observed point removed if it lies within a specified distance + time tolerance of the interpolated point. We can also curve fit the data and consider the distance to the curve rather than using a moving 3 point window.

The compression may also have differing goals based on the constraints given, e.g. to simply reduce the data size by removing redundant observations and spikes, or to smooth the data as well.

For the former, after checking for spikes based on defined constraints, we simply check the 3d distance of each point to the polyline connecting the compressed points. This is achieved by finding the pair of points before and after the point that has been removed, interpolating a position on the line connecting those points based on the observed time, and comparing the interpolated position with the observed position. The amount of points removed will increase as we allow this distance tolerance to increase.

For the latter we also have to consider how well the smoothed result models the data, the weights imposed by the constraints, and the design shape / curve parameters.

Hope this makes some sense.

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Yes. But i'm not trying to build compression algorithm. I have a series of well known algorithm (Douglas, Bellman, STTrace, OPW) and I need to benchmark this algorithm, to know what algorithm reduce better (in a spatio-temporal manner) the original trajectory. Not intersting on how algorithm realize this. –  marianoc84 Jan 24 '12 at 12:38
Fair enough, but different compression algorithms will have different characteristics in terms of they achieve. DWT just compresses, Ramer–Douglas–Peucker smooths, etc... You should maybe consider the characteristics you want to benchmark; speed to compress, compression ratio, data cleaning, data smoothing, lossy/lossless. You ask for which is 'better'. The answer is contextual based on application requirements. –  Shane MacLaughlin Jan 24 '12 at 12:49