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I would like to bin vectors in n-dimensional space. This can be done by pixelating the surface of an n-dimensional hypersphere.

Does anyone know any good algorithms for pixelating a hypersphere in C? I would like constant bin sizes. My space consists of only positive integers.

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Could you clarify? By "pixelate", do you mean "divide the surface up into regions"? Does this imply that all the input vectors lie on the surface? – Oliver Charlesworth Aug 31 '10 at 21:03
    
Thanks for your comment, yes; the surface should be divided up into regions of equal surface area. Each of the vectors is orthogonal to the surface. – KeatsKelleher Aug 31 '10 at 21:04
    
You potentially need more constraints than that to define an algorithm. For instance, imagine dividing a 3-dimensional sphere into 8 regions. You could do 8 north-south strips, or you could do 8 "corners" (i.e. dividing lines on the equator, the Greenwich meridian, and at longitude 90/270 degrees). And that's assuming they must all be the same shape... – Oliver Charlesworth Aug 31 '10 at 21:09
    
Sorry, I thought equal size and shape was implied by the term 'pixelate'. – KeatsKelleher Aug 31 '10 at 21:14
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@akellehe: My "trivial" north-south suggestion was to bin based on longitude only. – Oliver Charlesworth Aug 31 '10 at 22:11
up vote 1 down vote accepted

Do you need your bins to be perfectly regular? If not, just throw points out at random, and measure distance to the nearest neighbor. You could clean this up slightly by throwing away points that are too close, or running a few iterations of mutual repulsion.

Otherwise, you probably want to convert to generalized spherical coordinates and bin into equal areas along each dimension. In particular, if you know you're in bin 5 of 20 on longitude, your latitude bins will be wider than they would be at the equator (about sqrt(2) wider in angle, in fact, to correspond to the same distance on the surface).

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That's not too bad of an idea. Mulling it over... – KeatsKelleher Aug 31 '10 at 23:46
    
I do believe this is the way to go. I've not finished the algorithm but this is the right track :) – KeatsKelleher Oct 8 '10 at 16:22

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