# Algorithm to align and compare two sets of vectors which may be incomplete and ignoring scaling?

## Here is the problem:

I have many sets of points, and want to come up with a function that can take one set and rank matches based on their similarity to the first. Scaling, translation, and rotation do not matter, and some points may be missing from any of the sets of points. The best match is the one that if scaled and translated in the ideal way has the least mean square error between points (maybe with a cap on penalty, or considering only the best fraction of points to handle missing points).

I am trying to come up with a good way to do this, and am wondering if there are any well known algorithms that can handle this type of problem? Just the name of something would be awesome! I lack a formal CSCI or math education, and am doing the best to teach myself.

## A few things I have tried

The first thing that comes to mind is to normalize the points somehow, but I dont think that this is helpful because the missing points may throw things off.

The best way I can think of is to estimate a starting point by translating to match their centroids, scaling so that the largest distances from the centroid of the sets match. From there, do an A* search, scaling, rotating, and translating until I reach a maximum, and then compare the two sets. (I hope I am using the term A* correctly, I mean trying small translations and scalings and selecting the move giving the best match) I think this will find the global maximum most of the time, but is not guaranteed to. I am looking for a better way that will always be correct.

Thanks a ton for the help! It has been fun and interesting trying to figure this out so far, so I hope it is for you as well.

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## 2 Answers

There's a very clever algorithm for identifying starfields. You find 4 points in a diamond shape and then using the two stars farthest apart you define a coordinate system locating the other two stars. This is scale and rotation invariant because the locations are relative to the first two stars. This forms a hash. You generate several of these hashes and use those to generate candidates. Once you have the candidates you look for ones where multiple hashes have the correct relationships.

This is described in a paper and a presentation on http://astrometry.net/ .

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This is brilliant! I am assuming because of the hashes it is possible to make an index and search quickly.. I will try this out on my data. –  Charles Dec 10 '11 at 0:13

This paper may be useful: Shape Matching and Object Recognition Using Shape Contexts

Edit:

There is a couple of relatively simple methods to solve the problem:

1. To combine all possible pairs of points (one for each set) to nodes, connect these nodes where distances in both sets match, then solve the maximal clique problem for this graph. Since the maximal clique problem is NP-complete, the complexity is probably O(exp(n^2)), so if you have too many points, don't use this algorithm directly, use some approximation.
2. Use Generalised Hough transform to match two sets of points. This approach has less complexity (O(n^4)). But it is more complicated, so I cannot explain it here.

You can find the details in computer vision books, for example "Machine vision: theory, algorithms, practicalities" by E. R. Davies (2005).

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Thank you! Awesome place to start reading –  Charles Dec 10 '11 at 0:11