# Intersection of two convex polygons

I have two convex polygons. Polygons are implemented as cyclic lists of their vertices. How to find an intersection of this two polygons?

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## 1 Answer

``````For each edge V1-V2 in the first polygon,
Let H := Half-plane tangenting V1-V2, with the remaining
vertices on the "inside".
Let C := New empty polygon.
For each edge V3-V4 in the second polygon,
Let X := The intersection between V3-V4 and H.
If V3 inside H, and V4 is outside H then,
Add V3 to C.
Add X to C.
Else if both V3 and V4 lies outside H then,
Skip.
Else if V3 outside H, and V4 is inside H then,
Add X to C.
Else
Add V3 to C.
Replace the second polygon with C.
``````

This should suffice for simple usage; 10-20 vertices and not recalculating every frame. — O(n2)

Here is a few links:

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Are you sure that I have to add V3 to the intersection in case 3? It seems incorrect. –  DaZzz Oct 28 '12 at 8:30
I rewrote it to align better with the Sutherland-Hudgman algorithm. –  Markus Jarderot Oct 28 '12 at 8:54