# Calculate the distance between two integer Lists

I am using C# and I have two `list<AACoordinate>` where each element in these lists represents a 3D point in space by x,y and z.

`````` class AACoordinate
{
public  int ResiNumber { get; set; }
public double x { get; set; }
public double y { get; set; }
public double z { get; set; }
}
``````

Each list can contain 2000 or more points and my aim is to compare each point of list1 to all the points of list2 and if the distance is smaller than a specific number I keep a record of it. at the moment I am using foreach to compare each element of list1 to all of list2. This is quite slow because of the number of points. Do you have any suggestion to make it fast?

my loop is:

`````` foreach (var resiSet in Program.atomList1)
{
foreach (var res in Program.atomList2)
{
var dis = EuclideanDistance(resiSet, res);
if (dis < 5)
}
}
``````

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can you share foreach loop body? –  sll Oct 31 '11 at 15:50
@sll: It's slow because comparing every point against every other point is an `n^2` operation. It's like doing a selection sort. –  Jim Mischel Oct 31 '11 at 15:51
You are describing a n*n solution. Can you be clearer about the 'keep it' criterion? –  Henk Holterman Oct 31 '11 at 15:52
Your problem is similar to the closest pair of points problem, en.wikipedia.org/wiki/Closest_pair_of_points_problem. There are several discussions of it here on SO. –  Jim Mischel Oct 31 '11 at 15:58
A small aside, the proposed algorithms assume a "single-space". He probably needs to merge the two lists and operate on the whole set of points (each with a source-list designator), throwing out results for same-list distances. –  Kit Nov 1 '11 at 16:13

Maybe is a little complicated to implement, but I don't have any other ideas than this:

To lower down the computational complexity probably you have to use some data structure like KD-Tree or QuadTree.

You can use a KD-Tree to do nearest neighbor search, and this is what you need.

1) You build your kd-tree for the first list in O(n log n). This must be done in a single thread.

2) For each item in your second list, you do a lookup in the kd-tree for the nearest neighbor (the nearest point to the point you are looking for), in O(m log n). If the distance from current point to the nearest found point is less than your delta, you have it. If you want you can do this step using multiple threads.

So at the end the complexity of the algorithm will be O(max(n, m) * log n) where n is the number of items in the first list, m is the number of items in the second list.

For KD-Trees, see:

See http://home.wlu.edu/~levys/software/kd/ this seems a good implementation, in java and C#.

And of course, look on Wikipedia what is a quadtree and a kd-tree

Consider that (2000 * log base 2(2000)) is about 21931.5

Instead 2000*2000 is 4000000, a big difference!

Using a parallel algorithm, if you have 4 processors, the normal O(n*n) algorithm will require 1000000 per processor, and I guess, it will be still too much if you need something fast or almost real time.

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You can use Parallel Libraries where you can find Parallel.ForEach. Paralel Example

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Parallel processing gives you, at best, linear speedup. His algorithm is quadratic. –  Jim Mischel Oct 31 '11 at 15:55
not sure parallel will help: since the complexity is m*n, a small increase in m or n will defeat the effort... –  Felice Pollano Oct 31 '11 at 15:55
Than hee need a Custom Solution ,but for sure parallelism must be present there ,maybe using Threadpool. –  Burimi Oct 31 '11 at 15:57
@Cody he brobably better need to reduce the complexity in someway –  Felice Pollano Oct 31 '11 at 16:31
@FelicePollano yes :) That is so true. In Italy we don't like quadratic algorithms, lol :) –  Salvatore Previti Oct 31 '11 at 16:38
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If you really want to compare each element of list1 with each of list2, you won't get rid of the nested for. But you could speed it up using Parallel.ForEach.

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