# A simple algorithm to merge non-overlapping polygons in C#

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?

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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

• 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).

Example:

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