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Bentley-Ottmann algorithm works for finding intersections of set of straight lines. But I have lot of polylines:

enter image description here

Is there a way to find intersections of the set of polylines?

I'm figuring out, but in the meanwhile, if someone can give some pointers or ideas, that would be helpful. Thanks for reading. By the way, I'm using WPF/C# and all the polylines are PathGeometry.

Source of the Image: http://www.sitepen.com/blog/wp-content/uploads/2007/07/gfx-curve-1.png

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2  
You can still use Bentley-Ottmann. – Bart Kiers Nov 14 '11 at 9:21
    
Thanks Bart. Could you explain please? Won't it find intersection points that are connecting points of the polyline itself? – Sam Nov 14 '11 at 9:26
2  
yes, whenever you find intersections, you check if it's a "real" intersection of two segments, or a point of two connected segments that belong to the same poly-line. – Bart Kiers Nov 14 '11 at 9:31
    
added some meta data and did that. but is there any algorithm specifically for polylines? – Sam Nov 14 '11 at 13:32
    
@Sam You might have better luck asking this question on math.stackexchange.com – Rachel Nov 14 '11 at 15:21

The sweep line algorithm has a nice theory but is hard to implement robustly. You need to treat vertical segments, and there might be cases where more than two line segments intersect in a single point (or even share a common line segment).

I'd use an R-Tree to store bounding boxes of the line segments of the polyline and then use the R-Tree to find possibly intersecting elements. Only these need to be tested for intersection. The advantage is that you can use a separate R-Tree for each polyline and thus avoid detection of selfintersections, if needed.

Consider using CGAL's exact predicates kernel to get reliable results.

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