Given is a Cartesian coordiante system, a from-position A (X/Y), and a to-position B (X/Y). I want to move from A to B. However, I can only move on the eight directions N, NE, E, SE, S, SW, W, NW.

I know that I can calculate the "best" of these directions to take from the current position A via the dot product with the unit vectors of the axis (the eight directions), where the biggest dot product is the direction to take. But this approach leads to some kind of "oscillation" between two directions, if A is exactly in between these two.

So I am searching for an algorithm now that sovles this problem of getting from A to B with only one or max. two directions to use. Of course I am ignoring any obstalces now, so that theoretically I can always get from A to B with a maximum of two different directions. I could probably solve this problem with a bunch of if-statements, but I would prefer a more elegant solution...

I hope that was somewhat understandable :)

Thanks in advance for any ideas!

Kind regards, Matthias

exactly between: say NNE, so it moves N then NE then N then NE then ... (where each leg of the journey is of an unspecified but relatively small length). For an infinitely small leg it's the "best" (as in shortest) path, but also has an unbound number of segments. I think the question is how to limit this to n segments, even if it lengthens the path :) – user166390 Sep 14 '11 at 23:24