How about merging shapes with edges that overlap?
We split the horizontal and vertical edges.
Then we order the horizontal edges such that all the edges on 3-10 (3-1, 1-2, 2-11, etc.) are following each other, then those on 7-9, then those on 2-6 (keep in mind that we first sort by their y value, since, if they are extended to the x-axis, they'd have the same y value there, then we sort by the smallest x end-point).
Then we order the vertical edges such that the edges on 2-3 (2-7 and 7-3) are following each other, then 14-1, then the 5-2 edges, etc. (keep in mind that they're parallel to the y-axis, so we just take their x value first, then we sort by the smallest y end-point).
Keep in mind that edges such as 14-1 will appear twice since it's an edge of both 10 and 9, and we'll have edges 7-8, 7-14 and 14-8.
Now we iterate through the edges:
We start with 3-1. It doesn't have a previous edge, so we do nothing. 1-2 start after its previous edge (3-1), so we do nothing. Similarly for 2-11, 11-41, 41-19 and 19-10.
Then 7-8. No previous edge, so do nothing. Then we do 7-14. Since
7 < 8, we merge the corresponding shapes 10 and 6.
And so on.