# How to form Concave shapes from convex pieces Confusion

Hey so i was told in a previous answer that to make concave shapes out of multiple convex ones i do the following:

If you don't have a convex hull, perform a package wrapping algorithm to get a convex border that encompasses all your points (again quite fast). en.wikipedia.org/wiki/Gift_wrapping_algorithm

Choose a point that is on the boarder as a starter point for the algorithm.

Now, itterate through the following points that are on your shape, but aren't on the convex border. When one is found, create a new shape with the vertices from the starter point to the found non-border point. Finally set the starter point to be the the found off-border point

Recursion is now your friend: do the exact same process on each new sub-shape you make.

I'm confused on one thing though. What do you do when two vertices in a row are off-border? After reaching the first one you connect the starter point to it, but then you immediatly run into another off-border point after you start itterating again, leaving you with only 2 vertices to work with: the starter point and new off-border point. What am i missing?

To illustrate my problem, here's a shape pertaining to this issue: It would be great if someone could draw all over it and walk through the steps of the algorithm using this. And using point 1 as the starting point.

Thanks!

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Do you mean that you want to create a convex shape from a concave one, not the other way around?? –  Darren Engwirda Jul 14 '11 at 8:27
Or are you trying to triangulate the polygon?? i.e. form a concave polygon from multiple (convex) triangles?? –  Darren Engwirda Jul 14 '11 at 8:33
@Darren: not quite, I think. If a polygon is convex but has more than three vertices, then the described algorithm leaves it alone, and the questioner's description is "convex pieces", not specifically triangles. Triangulating would provide a solution, but for shapes that are convex to begin with, or that have large convex subsets of vertices, it will split it into a lot more polygons than the requirements demand. –  Steve Jessop Jul 14 '11 at 9:08
The previous answer is plain wrong, that's all. The proposed algorithm won't work. Google "polygon partitioning", or look it up in "Computational Geometry in C" by Joseph O'Rourke. –  n.m. Jul 14 '11 at 10:11