I need help with constructing an Algorithm for the following problem.

I have a set of points *G* that can "see" other points *C*. Need an algorithm to find minimal set from *G* that covers all of *C* (*G* is not necessarily part of *C*).

I have a feeling that this should be solved with dynamic programming. But I am open to any solution/ideas that can help me.

Thanks!

**Edit 1:**

I may have not understood the problem fully.

The points are located on a 3d surface - with terrain heights. The terrain might go up to a certain height between the points, making it so a point can not see the other point. As long as there is a direct line of sight the points can see each other no matter what the distance.

if point

*a*(from*G*) can see point*b*(from*C*) - and point*b*can see*d*(from*C*), then*a*can see*d*. Not sure wether this makes a difference.if only

*a*(from*G*) can see*b*(from*C*) , we must choose*a*in order to cover all*C*- so better do that before using the greedy algorithm.

Still thinking if there are any other differences in light of the new information.

planeor are they located on a 3dsurface? – Vitalij Zadneprovskij May 17 '12 at 20:44