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I'm trying to implement a simple algorithm to merge some polygons. The polygons are not overlapping, and the algorithm I need doesn't have to be efficient at all. I'm looking for the simplest algorithm.

My problem is with polygons 10,9 and 6. As you can see, polygons 10 and 9 are NOT adjacent with 6 before they are merged. So if 9 and 5 are merged before 9 and 10, 6 won't have any chances to be merged with 10 and 9. But if I merge 10,9 first I'll be able to merge the final polygon with 10. How can I solve this?

enter image description here

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What if 10 wasn't there? Would you still merge 9 and 6 with each other and the rest? The end result for the above is supposed to be everything merged together into one massive block, right? – Dukeling Jun 4 '14 at 17:48
@Dukeling Yes, I would. maybe I'm making a mistake in the definition of the problem somewhere. – Vahid Jun 4 '14 at 17:50
Maybe the definition of polygon 6 is "malformed" (for lack of a better word) and it should be {2, 5, 8, 14, 7} instead of just {2, 5, 8, 7} without node 14? As it is, the edges {7, 8}, {7, 14} and {8, 14} are free edges. – M Oehm Jun 4 '14 at 18:13
@MOehm Actually I'm reading these data from a geometry definition file, so I don't have any choice to change it to the definition you proposed. – Vahid Jun 4 '14 at 18:15
@MOehm I have the coordinates of each vertex though, maybe I should use it to check for overlapping edges? – Vahid Jun 4 '14 at 18:18

How about merging shapes with edges that overlap?

  • Extract all the edges of all the shapes

  • Sort the edges

    • First by gradient,

    • Then by the y value where that edge would cross the x-axis if extended that far
      (or by x value if it's parallel to the y-axis),

    • Then by smallest y end-point of the edge (or smallest x point if it's parallel to the x-axis).

  • Iterate through the edges

    • The first two sorting criteria are just to eliminate non-overlapping edges (we can essentially consider those not matching the first two sorting criteria to be stored in a different data structure).

    • For the third criteria, do the following:

      If this edge starts before the end of the previous edge (with the same first two criteria), merge the shapes (if they haven't already been merged).


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.

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Thanks Dukeling, the solution is a little difficult to understand but it gave me a boost in my understanding of the problem. I'll try to implement this with the problem at hand and get back to you if I have any problems. – Vahid Jun 4 '14 at 18:28

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