# Find a bijection that best preserves distances

I have two spaces (not necessarily equal in dimension) with N points. I am trying to find a bijection (pairing) of the points, such that the distances are preserved as well as possible.

I can't seem to find a discussion of possible solutions or algorithms to this question online. Can anyone suggest keywords that I could search for? Does this problem have a name, or does it come up in any domain?

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There is also a `homework` tag, and there is no shame to use it... –  ring0 Nov 28 '10 at 4:56
Please clarify such that the distances are preserved **as well as possible** –  belisarius Nov 28 '10 at 5:56
You might try mathoverflow.net as well. –  mu is too short Nov 28 '10 at 6:16
You might try "optimal transportation" as keywords, or "monge-kantorovitch problem". Although it seems not directly related to your problem, this may help you to state it precisely. –  Alexandre C. Nov 28 '10 at 10:59
I didn't define the "distances are preserved as well as possible" part because I don't actually have a definition in my mind. I had a vague idea of what I wanted, and just needed to explore the associated literature. (just lacked the keywords to google for). –  karpathy Nov 28 '10 at 19:50

I believe you are looking for a Multidimensional Scaling algorithm where you are minimizing the total change in distance. Unfortunately, I have very little experience in this area and can't be of much more help.

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damn. You nailed it right on its head, and from a pretty terse description. If you would have said 'SMACOF' that would probably been enough to give the solution. Anyway, +1 from me. –  doug Nov 28 '10 at 13:15
This is actually exactly what I was looking for. MDS is the keyword I needed! Thanks! –  karpathy Nov 28 '10 at 19:53