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Traversing the boundary points of a polygon made of connected triangles

I have a two dimensional polygon mesh made of connected triangles represented like this:

• vertex array: V = A, B, C, D, E, ...
• index array, triangle vertex indices in groups of 3 in counter-clockwise-order: I = 0, 4, 3, ...
(so that e.g. V[0], V[4], V[3] which is A-E-D forms a triangle)

Example mesh

Now i want to traverse the boundary points in counter-clockwise-order, the starting vertex doesn't matter:
G, H, A, D, C, F

Whats the best way to do this? I thought about computing a convex hull, but this seems too expensive because it's not using the triangle vertex indices, there has to be a better way.

Is there a way to make it work even for several polygons in one representation so that i get a list of boundary point lists for every connected polygon?

Thanks, abenthy

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1. Find the boundary edges, this is done by traversing all the edges of the triangles and removing all edges which occur twice (because all edges except the boundary edges are shared by two triangles) (Also remember (A, B) is the same edge as (B, A)).