# Point in polygon on Earth globe

I have a list of coordinates (latitude, longitude) that define a polygon. Its edges are created by connecting two points with the arc that is the shortest path between those points.

My problem is to determine whether another point (let's call it U) lays in or out of the polygon. I've been searching web for hours looking for an algorithm that will be complete and won't have any flaws. Here's what I want my algorithm to support and what to accept (in terms of possible weaknesses):

1. The Earth may be treated as a perfect sphere (from what I've read it results in 0.3% precision loss that I'm fine with).
2. It must correctly handle polygons that cross International Date Line.
3. It must correctly handle polygons that span over the North Pole and South Pole.

I've decided to implement the following approach (as a modification of ray casting algorithm that works for 2D scenario).

1. I want to pick the point S (latitude, longitude) that is outside of the polygon.
2. For each pair of vertices that define a single edge, I want to calculate the great circle (let's call it G).
3. I want to calculate the great circle for pair of points S and U.
4. For each great circle defined in point 2, I want to calculate whether this great circle intersects with G. If so, I'll check if the intersection point lays on the edge of the polygon.
5. I will count how many intersections there are, and based on that (even/odd) I'll decide if point U is inside/outside of the polygon.

I know how to implement the calculations from points 2 to 5, but I don't have a clue how to pick a starting point S. It's not that obvious as on 2D plane, since I can't just pick a point that is to the left of the leftmost point.

Any ideas on how can I pick this point (S) and if my approach makes sense and is optimal?

Thanks for any input!

• Each simple polygon dissects the sphere into two parts. Which one is 'inside' and which is 'outside'...? It's quite simple on a plane – the outside is the unbound part, but on a sphere both parts are bounded. And they can even be equal! Consider a 'quadrilateral polygon' whose all vertices are on the equator, with coordinates in degrees: (0, 0), (0, 90), (0,180), (0, -90)... – CiaPan Jul 4 '16 at 14:28
• To my surprise it seems I answered (a near-duplicate of) this question a few years ago stackoverflow.com/questions/3067095/… – High Performance Mark Jul 4 '16 at 14:33
• In my case I will have areas that shouldn't span over half of the world (it will be more or less local regions rather than global ones), so we may assume that 'inside' is smaller than 'outside'. Even without that assumption I don't think that it matters, if we can solve the problem for 'inside' we can do it for the 'outside' as well. – MateuszPrzybyla Jul 4 '16 at 14:35
• Have a look at "Locating a Point on a Spherical Surface Relative to a Spherical Polygon of Arbitrary Shape". – Jean-Baptiste Yunès Jul 4 '16 at 15:14
• @1valdis - I was doing it commercially for my employee, so I don't possess rights to publish it - sorry :( but I can say that it was pretty straightforward to map it one-to-one to Java code – MateuszPrzybyla Dec 2 '18 at 18:42