Nearest-neighbor algorithm with directions (left / right / top / bottom)

Having n random points in 2D geometry, for each point `p` I need to find 4 (or less if not exists) closest points (`qa`,`qb`,`qc`,`qd`), where qa is the closest left-top point, qb is the closest right-top point, qc is the closest left-bottom point and qd is the closest right-bottom point to point p. Having same x coordinate is considered as left, having same y coordinate is considered as bottom.

What would be the best data structure to store point coordinates and their nearest-neighbor references? What algorithm would be the fastest or the most performed?

Note: This issue is far more then nearest-neighbor algorithm, as for each point 4 neighbor points are needed.

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Is this homework? If so, add the `homework` tag. –  TheZ Jul 18 '12 at 22:24
Suppose you have a bunch of points arranged around the point `p` in a perfect circle. How do you choose between them? –  Mark Ransom Jul 18 '12 at 22:28
Not putting this as an answer because I'm only referencing the data structure, but personally, I would use a linked list. Where each node is a point, and its connected to its closest neighbors. This will create a web that you can reference. As far as efficient construction, I'd have to think about that for a little bit lol –  Jlange Jul 18 '12 at 22:29
@MarkRansom - If there are more points with same distance, then I would do subsorting by y coordinate –  Ωmega Jul 18 '12 at 22:31
@Jlange - I strongly believe that data structure will be set by algorithm. –  Ωmega Jul 18 '12 at 22:33

You can try a space filling curve and a quadtree data structure. A space filling curve reduces the 2 dimension to 1 dimension and it works best with power of 2 grids. A quadtree divides the plane into 4 quads. A space filling curve is mathematical function taking 2 variables and gives 1 number as result. It can have also 3,4,5 variables but the most simple is with 2. Because it gives 1 number and takes 2 variables it can help for questions with 2 dimensions or more.

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How can space filling curve help with distance calculation? –  Ωmega Jul 18 '12 at 23:42
You can order the points along a curve. –  Phpdna Jul 18 '12 at 23:46
It would tranform `(x,y)` to `z`, but such `z` value is not going to help to find the nearest neighbor in each of 4 quads. –  Ωmega Jul 19 '12 at 0:30
It can help to find a shape around your center point. –  Phpdna Jul 19 '12 at 0:41
There is no center point. I need to find neigbhor to each point. I would need to create space filling curve for each point and once some point is added, wash out all data and start again - that is not right way for my task. –  Ωmega Jul 19 '12 at 0:47