# Algorithm to find the closest 3 points that when triangulated cover another point

Picture a canvas that has a bunch of points randomly dispersed around it. Now pick one of those points. How would you find the closest 3 points to it such that if you drew a triangle connecting those points it would cover the chosen point?

Clarification: By "closest", I mean minimum sum of distances to the point.

This is mostly out of curiosity. I thought it would be a good way to estimate the "value" of a point if it is unknown, but the surrounding points are known. With 3 surrounding points you could extrapolate the value. I haven't heard of a problem like this before, doesn't seem very trivial so I thought it might be a fun exercise, even if it's not the best way to estimate something.

-
How would you like to define "closest 3 points"? Smallest average distance? Smallest area triangle? –  mbeckish Nov 19 '10 at 21:29
Your question is ambiguous. Do you want to minimize the triangle's surface? The product of the three distances? –  Tobu Nov 19 '10 at 21:30
I think you need to be more precise with your definition of "closest". Triangle with minimum area? Minimum sum of distances to the point? Nearest point must be included in the triangle? –  Ben Jackson Nov 19 '10 at 21:30
Clarified. Either would be fine I guess... but I don't want long/sliver triangles. I think minimum distance would be better at avoiding that. –  Mark Nov 19 '10 at 21:40

Your problem description is ambiguous. Which triangle are you after in this figure, the red one or the blue one?

The blue triangle is closer based on lexicographic comparison of the distances of the points, while the red triangle is closer based on the sum of the distances of the points.

Edit: you clarified it to make it clear that you want the sum of distances to be minimized (the red triangle).

1. Assume that the chosen point is at the origin (makes description of algorithm easy).
2. Sort the points by distance from the origin: P(1) is closest, P(n) is farthest.
4. For each triple of points P(a), P(b), P(i) with a < b < i, if the triangle contains the origin, let s = min(s, |P(a)| + |P(b)| + |P(i)|).
5. If s ≤ |P(1)| + |P(2)| + |P(i)|, stop.
6. If i = n, stop.
7. Otherwise, increment i and go back to step 4.

Obviously this is O(n³) in the worst case.

Here's a sketch of another algorithm. Consider all pairs of points (A, B). For a third point to make a triangle containing the origin, it must lie in the grey shaded region in this figure:

By representing the points in polar coordinates (r, θ) and sorting them according to θ, it is straightforward to examine all these points and pick the closest one to the origin.

This is also O(n³) in the worst case, but a sensible order of visiting pairs (A, B) should yield an early exit in many problem instances.

-
The red one is better :) –  Mark Nov 19 '10 at 21:41
Clarification: By "closest", I mean minimum sum of distances to the point. See edit on Q. –  belisarius Nov 19 '10 at 21:43
BTW "triangle contains the origin" means "the sum of inter-points angles adds up Pi" –  belisarius Nov 19 '10 at 22:04
1. Like @thejh suggests, sort your points by distance from the chosen point.
2. Starting with the first 3 points, look for a triangle covering the chosen point.
3. If no triangle is found, expand you range to include the next closest point, and try all combinations.
4. Once a triangle is found, you don't necessarily have the final answer. However, you have now limited the final set of points to check. The furthest possible point to check would be at a distance equal to the sum of the distances of the first triangle found. Any further than this, and the sum of the distances is guaranteed to exceed the first trinagle that was found.
5. Increase your range of points to include the last point whose distance <= the sum of the distances of the first triangle found.
6. Now check all combinations, and the answer is the triangle found from this set with the minimal sum of distances.
-
That sounds like it should work :) Sounds a bit like A* or something. –  Mark Nov 19 '10 at 21:55

Just a warning on the iterative method. You may find a triangle with 3 "near points" whose "length" is greater than another resulting by adding a more distant point to the set. Sorry, can't post this as a comment.

See Graph.

Red triangle has perimeter near 4 R while the black one has 3 Sqrt[3] -> 5.2 R

-
Yes, this is the reason why, after you've found one triangle, you need to keep searching until you can prove that the triangle you found is the minimum. See step 5 in my answer. –  Gareth Rees Nov 19 '10 at 22:46
@Gareth Yep. Not all answers take care of that, I guess. –  belisarius Nov 19 '10 at 22:47

second shot

subsolution: (analytic geometry basics, skip if you are familiar with this) finding point of the opposite half-plane

Example: Let's have two points: A=[a,b]=[2,3] and B=[c,d]=[4,1]. Find vector u = A-B = (2-4,3-1) = (-2,2). This vector is parallel to AB line, so is the vector (-1,1). The equation for this line is defined by vector u and point in AB (i.e. A):

``````X = 2 -1*t
Y = 3 +1*t
``````

Where t is any real number. Get rid of t:

``````t = 2 - X
Y = 3 + t = 3 + (2 - X) = 5 - X
X + Y - 5 = 0
``````

Any point that fits in this equation is in the line.

Now let's have another point to define the half-plane, i.e. C=[1,1], we get:

``````X + Y - 5 = 1 + 1 - 5 < 0
``````

Any point with opposite non-equation sign is in another half-plane, which are these points:

``````X + Y - 5 > 0
``````

solution: finding the minimum triangle that fits the point S

1. Find the closest point P as min(sqrt( (Xp - Xs)^2 + (Yp - Ys)^2 ))
2. Find perpendicular vector to SP as u = (-Yp+Ys,Xp-Xs)
3. Find two closest points A, B from the opposite half-plane to sigma = pP where p = Su (see subsolution), such as A is on the different site of line q = SP (see final part of the subsolution)
4. Now we have triangle ABP that covers S: calculate sum of distances |SP|+|SA|+|SB|
5. Find the second closest point to S and continue from 1. If the sum of distances is smaller than that in previous steps, remember it. Stop if |SP| is greater than the smallest sum of distances or no more points are available.

I hope this diagram makes it clear.

-
This seems to be O(n), should be fast enough with many points to calculate. –  Jan Turoň Nov 20 '10 at 11:51
I'm afraid it's unclear to me what kind of "sub-plane" you are defining in step 3. Do you mean "half-plane"? If so, which line bounds this half-plane? Your notation is also a bit strange: when you say "p = Su" what kind of vector multiplication do you mean here (dot or cross product?) or do you mean "p = S + u"? Maybe a diagram would make it clear. –  Gareth Rees Nov 20 '10 at 12:13
@Gareth: indeed, sub-plane is half-plane (pardon my english). By p = Su I mean (line p is defined by point S and vector u). Diagram added, please correct if something is wrong or still unclear. –  Jan Turoň Nov 20 '10 at 15:47
Thanks for the diagram. It's clear now. But why do A and B have to be in opposite half-plane? Why couldn't one of them be in the half-plane sigma? –  Gareth Rees Nov 20 '10 at 18:26
@Gareth: Good point. I presume, that the "opposite half-plane" condition does not "miss" some solution. In the diagram above, if the A point would be in sigma, we would not find the solution in step one, but later, when A or B would be the initial point. But I have no idea of proof / counterexample, can you help? –  Jan Turoň Nov 20 '10 at 22:55

Take the closest N=3 points. Check whether the triange fits. If not, increment N by one and try out all combinations. Do that until something fits or nothing does.

-
This will find a triangle such that the maximum point distance is minimized. This may or may not be what @Mark means by "closest 3 points". For example, if N=5, you may find a triangle using points 3, 4, and 5, and then stop. But if you went further, you might find a triangle using points 1, 2, and 6. If 1 and 2 are very close the the covered point, then this might be the desired answer. –  mbeckish Nov 19 '10 at 21:38
Without actually having a counterexample, I suspect that will not guarantee to find the solution where the sum of distances is minimal. –  Doc Brown Nov 19 '10 at 21:41
But this is O(n^2) steps - and the problem "whether triangle fits" is not trivial, too. –  Jan Turoň Nov 19 '10 at 21:41
Mmmm O(n^2) is when you have to check against the previous points, here you have to check against combinations of previous points .. seems O(n^3) –  belisarius Nov 19 '10 at 21:58
@belisarius: yes +1 –  Jan Turoň Nov 20 '10 at 11:29

This is my first shot:

1. split the space into quadrants with picked point at the [0,0] coords
2. find the closest point from each quadrant (so you have 4 points)
3. any triangle from these points should be small enough (but not necesarilly the smallest)
-
It seems that the triangle may not cover the point ... –  belisarius Nov 19 '10 at 21:37
true... first shot misses :-) –  Jan Turoň Nov 19 '10 at 21:48