Hi ive done some researchs in this forum and didnt really find a prpoer answer to my problem. I need to solve , with the fastest algorithm possible a financial problem. Given p set of points , each set have n points , i need to find the algorithm wich will calculate all the closest points between every set of points. I think it can be done with the closest pair algo or the nearest neighbour but i dont see how can i make it in less than o(n^2) operations.

If this is a code question, at least give some code. if it is a mathematical question there is a division made just for mathematics. 


So, there are a few acceleration structures that you could use to get faster lookups. You could create a Kd tree for each set. That would mean that each lookup would take O(log(n)), so the total for all lookups would be O(n log(n)). The creation of the kd trees would take O(n log(n)) by itself. Adding those together you still get O(n log(n)). However, in most realworld cases, the O isn't the only thing to consider  the scalar factors are also very important. Kd trees are pretty straightforward to implement. Depending on the shape of your data (whether you have a lot of overlaps), you might be able to find some more speed using a different acceleration structure. 

