I have a database with 500,000 points in a 100 dimensional space, and I want to find the closest 2 points. How do I do it?
Update: Space is Euclidean, Sorry. And thanks for all the answers. BTW this is not homework.
I have a database with 500,000 points in a 100 dimensional space, and I want to find the closest 2 points. How do I do it? Update: Space is Euclidean, Sorry. And thanks for all the answers. BTW this is not homework. 


You could try the ANN library, but that only gives reliable results up to 20 dimensions. 


There's a chapter in Introduction to Algorithms devoted to finding two closest points in twodimensional space in O(n*logn) time. You can check it out on google books. In fact, I suggest it for everyone as the way they apply divideandconquer technique to this problem is very simple, elegant and impressive. Although it can't be extended directly to your problem (as constant edit 


Run PCA on your data to convert vectors from 100 dimensions to say 20 dimensions. Then create a KNearest Neighbor tree (KDTree) and get the closest 2 neighbors based on euclidean distance. Generally if no. of dimensions are very large then you have to either do a brute force approach (parallel + distributed/map reduce) or a clustering based approach. 


Use the data structure known as a KDTREE. You'll need to allocate a lot of memory, but you may discover an optimization or two along the way based on your data. http://en.wikipedia.org/wiki/Kdtree. My friend was working on his Phd Thesis years ago when he encountered a similar problem. His work was on the order of 1M points across 10 dimensions. We built a kdtree library to solve it. We may be able to digup the code if you want to contact us offline. Here's his published paper: http://www.elec.qmul.ac.uk/people/josh/documents/ReissSelbieSandlerWIAMIS2003.pdf 


Use a kd tree. You're looking at a nearest neighbor problem and there are highly optimized data structures for handling this exact class of problems. http://en.wikipedia.org/wiki/Kdtree P.S. Fun problem! 

