# Split quadrilateral into sub-regions of a maximum area

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It is pretty easy to split a rectangle/square into smaller regions and enforce a maximum area of each sub-region. You can just divide the region into regions with sides length sqrt(max_area) and treat the leftovers with some care.

With a quadrilateral however I am stumped. Let's assume I don't know the angle of any of the corners. Let's also assume that all four points are on the same plane. Also, I don't need for the the small regions to be all the same size. The only requirement I have is that the area of each individual region is less than the max area.

Is there a particular data structure I could use to make this easier?
Is there an algorithm I'm just not finding?

Could I use quadtrees to do this? I'm not incredibly versed in trees but I do know how to implement the structure.

I have GIS work in mind when I'm doing this, but I am fairly confident that that will have no impact on the algorithm to split the quad.

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What does it mean to split an area into smaller regions and enforce a maximum area? – cheeken Jun 27 '12 at 0:43
Do you mean split the region into sub-regions such that each sub-region has an area no larger than a given value? – Vaughn Cato Jun 27 '12 at 0:44
Are the quadrilaterals a collection of 4 points on the same plane? – Sean Johnson Jun 27 '12 at 0:46
@VaughnCato yes, that is exactly what I meant. Sean, all four points are on the same plane. – Jake Jun 27 '12 at 0:54
While not exactly what you want to do, take a look at this similar sounding question and its answers. – martineau Jun 27 '12 at 1:49

You could recursively split the quad in half on the long sides until the resulting area is small enough.

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What would you do with a shape like the bottom right in the image on wikipedia? en.wikipedia.org/wiki/Quadrilateral – Jake Jun 27 '12 at 0:52
@jake: Break it into two triangles first – Vaughn Cato Jun 27 '12 at 0:55
@Jake: Do you have a requirement that the sub-regions also be quadrilaterals? – Vaughn Cato Jun 27 '12 at 0:58
@VaughnCato Yes. – Jake Jun 27 '12 at 1:00
@VaughnCato also, dividing the shape into two triangles first would add another arbitrary boundary. A subregion would then be unable to belong to both triangles. – Jake Jun 27 '12 at 1:06
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If you have a way of doing it to the square, you can map the quadrilateral to the square, perform your algorithm, and then map the returned points back to your original rectangle using the inverse of that matrix.

In that answer, the thing you're looking for is the transformation matrix `B`:

`````` [x1 y1 x1*y1 1]              [x1' y1' x1'*y1' 1]
[x2 y2 x2*y2 1]   *  B  =    [x2' y2' x2'*y2' 1]
[x3 y3 x3*y3 1]              [x3' y3' x3'*y3' 1]
[x4 y4 x4*y4 1]              [x4' y4' x4'*y4' 1]
``````

To find `B`, you left-multiply both sides of the equation by the inverse of the first matrix. When you multiply a matrix by its inverse, the resulting matrix is the identity matrix (think of the number `1`), which can be done away with:

``````         [x1 y1 x1*y1 1] -1      [x1' y1' x1'*y1' 1]
B  =    [x2 y2 x2*y2 1]     *   [x2' y2' x2'*y2' 1]
[x3 y3 x3*y3 1]         [x3' y3' x3'*y3' 1]
[x4 y4 x4*y4 1]         [x4' y4' x4'*y4' 1]
``````

`B` can be precomputed.

Now, perform your algorithm to the quadrilateral `(p1', p2', p3', p4')`, which should be easy (if not trivial).

Finally, the five points that make up the splitting of the square or rectangle can be mapped back into the original quadrilateral's coordinates by multiplication:

``````         [x]     [x_orig]
B   *   [y]  =  [y_orig]
[z]     [z_orig]
[1]     [   1  ]
``````
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 I was worried about having to do something like that. It seems like it could get really complicated really fast. – Jake Jun 27 '12 at 0:58 What's complicated about it? Just multiply the matrices and the column vectors and magic happens. – Blender Jun 27 '12 at 0:59 We are very quickly getting beyond my math skill set. This looks a lot like linear algebra and that scares me. However, I am giving the page a read through to try and grasp what is happening. – Jake Jun 27 '12 at 1:03 Well, you're dealing with an area of mathematics that is dominated primarily by linear algebra and derivative concepts. Matrix multiplication is really simple to implement, even easier if you use Numpy. – Blender Jun 27 '12 at 1:04 I didn't realize that. I'll buckle down and learn the subject matter then. – Jake Jun 27 '12 at 1:08