Pis star-shaped if there exists a point
pin the interior of
Pthat is in the shadow of every point on the boundary of
P. The set of all such points
pis called the kernel of
For example, in a pentagram, the center points can be reached from the shadow of all the points lying on the boundary of
P if the light source is considered to be infinity. A star polygon is not necessarily star in shape.
Given an n-vertex, star-shaped polygon
P specified by its vertices in counterclockwise order, how to compute convex hull of this polygon in linear time.
I am getting no clue in this question. The algorithms I can think of are O(n * log(n)). I am not able to understand how to use this extra bit of information.