I am trying to solve a travelling salesman problem in c++, but i have to traverse the shortest distance between a set of poylgons instead of a set of points. To do so, i am trying to represent each polygon by a representative "mean" interior point so that i can do a TSP on these mean interior points.

It is easy for me to find a mean interior point in a convex polygon because it is simply the arithmetic mean point (and will always lie inside for a convex polygon), but this approach will not work for a concave polygon because it will not necessarily be interior to the polygon.

Help on this? Thanks. :-)

`algorithm`

because this is basically algorithmic problem. What kind of complexity can you afford? – Boris Strandjev Dec 13 '12 at 12:50`mean INTERIOR`

point? – Xyand Dec 13 '12 at 12:56approximation, in which case I don't understand why interior is neccessary. Or ashortest pathin general, in which case I would not use mean representatives, but get rid of polygons alltogether and transform the problem into TSP directly. – Fiktik Dec 13 '12 at 13:02