A polygon

`P`

isstar-shapedif there exists a point`p`

in the interior of`P`

that is in theshadowof every point on the boundary of`P`

. The set of all such points`p`

is called thekernelof`P`

.

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.