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I have polygon chains similar to the following...

alt text

...given the chain in the image, how would I go about calculating a chain that defines the same shape but without crossing paths?

Specifically, in the case of the image's input chain, the result I want looks like this:

A1,
A2,
Intersect between A2 and A3,
Intersect between A3 and A4,
A4,
A5,
Intersect between A3 and A4,
A3,
Intersect between A3 and A2,
A6

I'm looking for an algorithm to accomplish this for any chain, but I'm not sure what I'm trying to do is even called, which makes searching for a solution tricky.

If there's a name for what I'm trying to do it would be of great help to know it.

Thank you for any assistance!

share|improve this question
    
Your question is not very clear. Can you please provide a figure for what you expect the output to be? Also what exactly is meant by same shape? Shape does not seem well defined for paths... –  Aryabhatta Jun 4 '10 at 4:35
    
@Moron, but I listed the exact output I'm looking for - the image I linked to gives the output I listed context. –  Monte Hurd Jun 4 '10 at 4:56
    
Thanks for the edit Nick! I should have known I could just embed the image. –  Monte Hurd Jun 4 '10 at 4:57
    
@Moron, "Also what exactly is meant by same shape?" - The best way I can explain it is, if you played "connect the dots" with the results chain you'd draw the exact same shape. You'd just be connecting the dots such that your pen never crossed a line it had already drawn (although it could stop at a single point more than once). –  Monte Hurd Jun 4 '10 at 5:21

1 Answer 1

up vote 3 down vote accepted

Here's a simple algorithm:

for each line segment in the chain:
    Identify any segments which cross this segment
    If crossings > 0
         Follow the branch to the right, if this doesn't lead back to the 
         current intersection follow the branch to the left
    go to the next line segment

If following a branch doesn't lead back to that intersection before getting to the end of the chain that means you have skipped a loop, so you need to choose the other branch.

For your example, running this algorithm would produce

Start at segment A1-A2
No intersections, goto next
Segment A2-A3
Intersection A2-A3/A6-A5 choose right path and store the current intersection somewhere
Segment A6-A5
Intersection A6-A5/A4-A3 choose right path and store intersection
Segment A3-A4
A4-A5
A5-A6
Back at intersection A6-A5/A4-A3, go right again to be back on A4-A3
A3-A2
Back at intersection A2-A3/A6-A5, go right again
Finish
share|improve this answer
    
But wouldn't that break down if the intersects got complicated? As in this image: imgur.com/hBLwz.jpg –  Monte Hurd Jun 4 '10 at 7:54
1  
@Monte You're right, it looks like it's possible for the algorithm to return to a previous path. If it does this however it must be the case that there is more than one bad intersection (else the other path would be traversable), so a record can be made of which intersections you've already tried, eg img526.imageshack.us/img526/3117/path.png –  Scott Wales Jun 4 '10 at 13:30
    
You are amazing. I have a much more clear mental picture of your approach now!!! –  Monte Hurd Jun 4 '10 at 15:37
    
great visual explanation! Would +2 if I could. –  Bart Kiers Jun 4 '10 at 17:32

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