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):

- 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).
- It must correctly handle polygons that cross International Date Line.
- 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).

- I want to pick the point
**S**(latitude, longitude) that is outside of the polygon. - For each pair of vertices that define a single edge, I want to calculate the great circle (let's call it
**G**). - I want to calculate the great circle for pair of points
**S**and**U**. - 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. - 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!