I need to obtain the intersection of two curves. The problem I'm facing can be stated in the following way:
Given two curves C1 and C2, defined by N1 and N2 points connected by straight lines, obtain all the intersections of C1 with C2. Both curves don't intersect themselves.
I tried several approaches, but none seems to work so far. Any guess?
The easiest way is to test all pairs of segments, one from each curve. If that is too slow, try a strip tree. The paper below can be found at the author's web site.
Ballard, D. H. (1981), Strip trees: a hierarchical representation for curves, Communications of the ACM, v.24 n.5,310-321
Since your curves are comprised of line segments, I would suggest using a spatial tree (e.g. a quadtree) to only check segments that are in proximity to each other. This will reduce the complexity of your algorithm from O(N1 N2) to O(N log N) (where N = N1 + N2), assuming that the number of very close intersections is small.
Other than that, you can find intersections in this way.
