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Suppose I have an array of points in random order, and I need to find a polygon (by sorting them, such that every adjacent pair represents a side) which passes through all of the points, and its sides are non-intersecting of course.

I tried to do it by selecting a point, and adding all points to the final array which are below it, sorted left to right. Then, adding all points which are above it, sorted right to left.

I've been told that I can add an additional point and sort naturally to avoid self-intersections.. I am unable to figure out that though. What's a simple way to do this?

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Sounds like the "Travelling Salesman Problem" –  Axel Kemper Jan 10 '13 at 17:12
@AxelKemper Except that OP doesn't seem to look for the shortest path but for any non self-intersecting one. I don't think an optimization is needed. –  dystroy Jan 10 '13 at 17:14
I've made significant changes to my answer. Email me if you want the Mathematica code. –  Codie CodeMonkey Jan 11 '13 at 14:37
@max did u manage to solve this issue? –  Muhammad Umar Jun 29 at 13:30
@CodieCodeMonkey i would like to get your calculations. How can I contact you? –  Muhammad Umar Jun 29 at 13:32

6 Answers 6

up vote 2 down vote accepted

As someone said, the minimal length solution is exactly the traveling salesman problem. Here's a non-optimal but feasible approach:

Compute a Delauney triangulation of your points. Successively remove boundary segments until you are left with a boundary that interpolates all points or no more segments can be removed. Don't remove boundary segments if all points of the triangle using that segment are on the boundary. Take this boundary as your path.

I implemented this in Mathematica using 40 random points. Here is a typical result: enter image description here

The obvious objection is that you might get to a point where not all your points are boundary points, but you can't remove a boundary segment without making the boundary self intersecting. This is a valid objection. It took me dozens of runs to see a case where this happened, but finally got this case: enter image description here

You can probably see some obvious ways of fixing this using the local topology, but I'll leave the details to you! One thing that might help is "edge flipping" where you take two triangles that share a side, say triangle (p,q,r) and (q,p,s) and replace them with (r,p,s) and (r,s,q) (all coordinates counterclockwise around the triangle). This can be done as long as the resulting triangles in this transformation are also counterclockwise ordered.

To reduce the need for fix-ups, you will want to make good choices of the segments to remove at each step. I used the ratio of the length of the boundary segment to the sum of the lengths of the other side of the candidate triangle (the triangle formed by the potentially incoming point with the segment).

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I believe you can use Graham scan algorithm to solve your problem.

Edit: in general, Convex hull algorithms are something to look at.

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Convex hull can't do the job here, the polygon should pass through all points. –  Max Jan 10 '13 at 17:23
I think a modified Graham scan is exactly what the OP needs. Choose a point, and sort the rest of the points in clockwise (or counterclockwise) order. Connect the points in sorted order. The modification to Graham scan is that you don't need to worry about "left turns" or "right turns", because you won't be removing any points from the hull. –  mbeckish Jan 10 '13 at 21:25
@mbeckish I believe there is even no need to mention Graham scan - just select some location inside of convex hull (e.g. average of all points) and connect all points in clockwise order around the selected location. –  maxim1000 Jan 11 '13 at 14:23

What you are seeking is called a simple polygonization in the literature. See, for example, this web page on the topic. It is easy to generate a star-shaped polygonization, as Miguel says, but difficult to find, for example, a minimal perimeter polygonization, which is a minimal TSP, as Axel Kemper mentions. There are in general an exponential number of different polygonizations for a given point set.

          Four point polygonization

For the star-shaped polygonization, there is one issue that requires some attention: the extra point x (in the "kernel" of the star) must not coincide with an existing point! Here is one algorithm to guarantee x. Find the closest pair of points (a,b), and let x be the midpoint of segment ab. Then proceed as per Miguel's post.

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Testing if two segments intersect is simple and fast. See that for example.

With that you could build your polygon iteratively :

Source Points : S = {S0, ... Si, Sj,...}

Final Polygon : A = {A0, ... Ai, Aj,...}

You start with S full and A empty.

Take the first 3 points of S and move them to A. This triangle is of course not self intersecting.

Then, until S is empty, take its first remaining point, that we'll call P, and look for a position in A where it could be inserted.

This position is i+1 for the first i verifying that neither [Ai-P] nor [Ai+1-P] intersects any other segments [Ak-Ak+1].

Your new polygon A is thus {A0, ... Ai, P, Ai+1, ...}

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Well, if you don't actually care about minimality or anything like that, you can just place new point inside the convex hull and then order the other points by angle to this new point. You'll get a non-intersecting polygon.

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Our strategy is to make a plan where we are sure that the polygon includes all points, and that we can find an order to connect them where none of the lines intersect.

1. Find the leftmost points p
2. Find the rightmost point q
3. Partition the points into A, the set of points below pq, and B, the set of points above pq [you can use the left turn test on (p,q,?) to determine if a point is above the line].
4. Sort A by x-coordinate (increasing)
5. Sort B by x-coordinate (decreasing).
6. Return the polygon defined by p, the points in A, in order, q, the points of B in order.

Steps 1,2,3 take O(n) time.
Steps 4,5 take O(nlogn) time.
Step 6 take O(n) time.
Total runtime is O(nlogn).

By construction, all points besides p,q are in set A or set B. Our output polygon from line 6 therefore outputs a polygon with all the points. We now need to argue that none of the line segments in our output polygon intersect each other.

Consider each segment in the output polygon. The fi rst edge from p to the first point in A can't intersect any segment (because there is no segment yet). As we proceed in order by x-coordinate through the points in A, from each point, the next segment is going to the right, and all previous segments are to the left. Thus, as we go from p, through all the points of A, to point q, we will have no intersections.

The same is true as we go from q back through the points of B. These segments cannot intersect each other because they proceed from right to left. These segments also cannot intersect anything in A because all points in A are below line pq, and all points in B are above this line.

Thus, no segments intersect each other and we have a simple polygon.

Source: http://www.cs.wustl.edu/~pless/546/homeworks/hw1_selectedProblems.pdf

I understand this is really late, but it might be useful for future viewers.

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