is this possible to do in less than polynomial time?
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Hmm... interesting question. I believe the answer is yes. Roughly, find the plane equation of each of the faces; for every pair of conjoined faces, if the angle between them is obtuse, the volume is concave. This should run in O(log(n)) time. I'd bet there's some way of working this out using a graphcoloring algorithm, but I'm just not that clever... 


Use more words. We can;t know what exactly you are asking. We can only guess. I don't think spaces could be convex or concave in general... maybe you mean volume or area? In any case I dont think you are going to beat polynomial time, given the complexity of the surface is going to be polynomial in nature. 

