I'm trying to come up with an algorithm that will determine turning points in a trajectory of x/y coordinates. The following figures illustrates what I mean: green indicates the starting point and red the final point of the trajectory (the entire trajectory consists of ~ 1500 points):

In the following figure, I added by hand the possible (global) turning points that an algorithm could return:

Obviously, the true turning point is always debatable and will depend on the angle that one specifies that has to lie between points. Furthermore a turning point can be defined on a global scale (what I tried to do with the black circles), but could also be defined on a high-resolution local scale. I'm interested in the global (overall) direction changes, but I'd love to see a discussion on the different approaches that one would use to tease apart global vs local solutions.

What I've tried so far:

- calculate distance between subsequent points
- calculate angle between subsequent points
- look how distance / angle changes between subsequent points

Unfortunately this doesn't give me any robust results. I probably have too calculate the curvature along multiple points, but that's just an idea. I'd really appreciate any algorithms / ideas that might help me here. The code can be in any programming language, matlab or python are preferred.

**EDIT** here's the raw data (in case somebody want's to play with it):