Obviously, you can perform a O(N²) shortest path algorithm to find the optimal solution. However, the weights of the edges have to be obtained beforehand, which is the hardest part of this problem.

We tackle this subproblem by calculating the number of line segments an edge (u, v) intersects, which can be done in O(N²logN): For each vertex u you have to sort the vertices that are above u by polar angle. Now you perform a circular sweep line algorithm on the sorted vertices to check which line segments our sweep line enters or exit. The crucial crux of this problem is the condition Y_i < Y_i + 1 because every time we enter a line segment that belongs to vertex v we know that we have to cross this line to get to the other vertices behind v. Thus, we can use a Fenwick tree to easily obtain the number of segments we have to cross in order to get to a certain point.

Sorry, but I'm afraid there isn't one in English. Here you can download an archive with solution presentations, problem statements, official solutions and test data. However, presentations are usually well illustrated with pictures, so (maybe with some help from Google Translate) you might be able to get the idea.