A point in 3d is defined by (x,y,z). Distance d between any two points (X,Y,Z) and (x,y,z) is d= Sqrt[(Xx)^2 + (Yy)^2 + (Zz)^2]. Now there are a million entries in a file, each entry is some point in space, in no specific order. Given any point (a,b,c) find the nearest 10 points to it. How would you store the million points and how would you retrieve those 10 points from that data structure.

Million points is a small number. The most straightforward approach works here (code based on KDTree is slower (for querying only one point)). Bruteforce approach (time ~1 second)
Run it:
Here's the script that generates million 3D points:
Output:
You could use that code to test more complex data structures and algorithms (for example, whether they actually consume less memory or faster then the above simplest approach). It is worth noting that at the moment it is the only answer that contains working code. Solution based on KDTree (time ~1.4 seconds)
Run it:
Partial sort in C++ (time ~1.1 seconds)
Run it:
Priority Queue in C++ (time ~1.2 seconds)
Run it:
Linear Search based approach (time ~1.15 seconds)
Measurements shows that most of the time is spent reading array from the file, actual computations take on order of magnitude less time. 


If the million entries are already in a file, there's no need to load them all into a data structure in memory. Just keep an array with the topten points found so far, and scan over the million points, updating your topten list as you go. This is O(n) in the number of points. 


You could store the points in a kdimensional tree (kdtree). Kdtrees are optimized for nearestneighbor searches (finding the n points closest to a given point). 


I think this is a tricky question that tests if you don't try to overdo things. Consider the simplest algorithm people already have given above: keep a table of ten bestsofar candidates and go through all the points one by one. If you find a closer point than any of the ten bestsofar, replace it. What's the complexity? Well, we have to look at each point from the file once, calculate it's distance (or square of the distance actually) and compare with the 10th closest point. If it's better, insert it in the appropriate place in the 10bestsofar table. So what's the complexity? We look at each point once, so it's n computations of the distance and n comparisons. If the point is better, we need to insert it in the right position, this requires some more comparisons, but it's a constant factor since the table of best candidates is of a constant size 10. We end up with an algorithm that runs in linear time, O(n) in the number of points. But now consider what is the lower bound on such an algorithm? If there is no order in the input data, we have to look at each point to see if it's not one of the closest ones. So as far as I can see, the lower bound is Omega(n) and thus the above algorithm is optimal. 


This isn't a homework question, is it? ;) My thought: iterate over all points and put them into a min heap or bounded priority queue, keyed by distance from the target. 


This question is essentially testing your knowledge and/or intuition of space partitioning algorithms. I'd say that storing the data in an octree is your best bet. It's commonly used in 3d engines that handle just this kind of problem (storing millions of vertices, ray tracing, finding collisions, etc.). The lookup time will be on the order of 


No need to calculate the distance. Just the square of the distance should serve your needs. Should be faster I think. In other words, you can skip the 


Straightforward algorithm: Store the points as a list of tuples, and scan over the points, computing the distance, and keeping a 'closest' list. More creative: Group points into regions (such as the cube described by "0,0,0" to "50,50,50", or "0,0,0" to "20,20,20"), so you can "index" into them from the target point. Check which cube the target lies in, and only search through the points in that cube. If there are less than 10 points in that cube, check the "neighboring" cubes, and so on. On further thought, this isn't a very good algorithm: if your target point is closer to the wall of a cube than 10 points, then you'll have to search into the neighboring cube as well. I'd go with the kdtree approach and find the closest, then remove (or mark) that closest node, and research for the new closest node. Rinse and repeat. 


basically a combination of the first two answer above me. since the points are in a file there's no need to keep them in memory. Instead of an array, or a min heap, I would use a max heap, since you only want to check for distances less than the 10th closest point. For an array, you would need to compare each newly calculated distance with all 10 of the distances you kept. For a min heap, you have to perform 3 comparisons with every newly calculated distance. With a max heap, you only perform 1 comparison when the newly calculated distance is greater than the root node. 


This question needs further definition. 1) The decision regarding the algorithms that preindex data varies very much depending if you can hold the whole data in the memory or not. With kdtrees and octrees you will not have to hold the data in memory and the performance benefits from that fact, not only because the memory footprint is lower but simply because you will not have to read the whole file. With bruteforce you will have to read the whole file and recompute distances for each new point you will be searching for. Still, this might not be important to you. 2) Another factor is how many times will you have to search for a point. As stated by J.F. Sebastian sometimes bruteforce is faster even on large data sets, but take care to take into account that his benchmarks measure reading the whole data set from disk (which is not necessary once kdtree or octree is built and written somewhere) and that they measure only one search. 


For any two points P1 (x1, y1, z1) and P2 (x2, y2, z2), if the distance between the points is d then all of the following must be true:
Hold the 10 closest as you iterate over your entire set, but also hold the distance to the 10th closest. Save yourself a lot of complexity by using these three conditions before calculating the distance for every point you look at. 


Calculate the distance for each of them, and do Select(1..10, n) in O(n) time. That would the naive algorithm I guess. 

