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I have a set of rectangles and I would like to "reduce" the set so I have the fewest number of rectangles to describe the same area as the original set. If possible, I would like it to also be fast, but I am more concerned with getting the number of rectangles as low as possible. I have an approach now which works most of the time.

Currently, I start at the top-left most rectangle and see if I can expand it out right and down while keeping it a rectangle. I do that until it can't expand anymore, remove and split all intersecting rectangles, and add the expanded rectangle back in the list. Then I start the process again with the next top-left most rectangle, and so on. But in some cases, it doesn't work. For example: enter image description here

With this set of three rectangles, the correct solution would end up with two rectangles, like this: enter image description here

However, in this case, my algorithm starts by processing the blue rectangle. This expand downwards and splits the yellow rectangle (correctly). But then when the remainder of the yellow rectangle is processed, instead of expanding downwards, it expands right first and takes back the portion that was previously split off. Then the last rectangle is processed and it can't expand right or down, so the original set of rectangles is left. I could tweak the algorithm to expand down first and then right. That would fix this case, but it would cause the same problem in a similar scenario that was flipped.

Thank you in advance for any help.

Edit: Just to clarify, the original set of rectangles do not overlap and do not have to be connected. And if a subset of rectangles are connected, the polygon which completely covers them can have holes in it.

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possible duplicate of filling a polygon created from rectangles with rectangles –  Mr.Wizard May 7 '11 at 7:31
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possible duplicate of Find the set of largest contiguous rectangles to cover multiple areas –  finnw May 7 '11 at 10:30

2 Answers 2

up vote 79 down vote accepted

Despite the title to your question, I think you're actually looking for the minimum dissection into rectangles of a rectilinear polygon. (Jason's links are about minimum covers by rectangles, which is quite a different problem.)

David Eppstein discusses this problem in section 3 of his 2010 survey article Graph-Theoretic Solutions to Computational Geometry Problems, and he gives a nice summary in this answer on mathoverflow.net:

The idea is to find the maximum number of disjoint axis-parallel diagonals that have two concave vertices as endpoints, split along those, and then form one more split for each remaining concave vertex. To find the maximum number of disjoint axis-parallel diagonals, form the intersection graph of the diagonals; this graph is bipartite so its maximum independent set can be found in polynomial time by graph matching techniques.

Here's my gloss on this admirably terse description, using figure 2 from Eppstein's article. Suppose we have a rectilinear polygon, possibly with holes.

enter image description here

When the polygon is dissected into rectangles, each of the concave vertices is going to be met by an edge of the dissection. So we get the minimum dissection if as many of these edges as possible do double-duty, that is, they connect two of the concave vertices.

So let's draw all the axis-parallel diagonals between two concave vertices (a diagonal of a polygon is a line connecting two non-adjacent vertices). We are going to want to use as many of these lines as possible in the dissection.

enter image description here

The intersection graph of a set of line segments has a node for every line segment, and an edge joins two nodes if the lines cross. Here's the intersection graph for the axis-parallel diagonals:

enter image description here

It's bipartite with the vertical diagonals in one part, and the horizontal diagonals in the other part. Now, we want to pick as many of the diagonals as possible as long as they don't intersect. This corresponds to finding the maximum independent set in the intersection graph.

Finding the maximum independent set in a general graph is an NP-complete problem, but in the special case of a bipartite graph, König's theorem shows that it's equivalent to the problem of finding a maximum matching, which can be solved in polynomial time, for example by the Hopcroft–Karp algorithm. Here's the maximum matching:

enter image description here

And here are the corresponding minimum vertex cover (red) and maximum independent set (green):

enter image description here

Translating this back into the dissection problem, this means that we can use five axis-parallel diagonals in the dissection:

enter image description here

Finally, make a cut from each remaining concave corner to complete the dissection:

enter image description here

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+1 I didn't read your answer but realy like shapes :) –  Saeed Amiri Oct 11 '11 at 10:39
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Thanks Gareth, I was waiting to try to implement this before marking it as the answer, but I haven't been back on this project in a while. I just had to do a bug fix in that area so I took a closer look at this and your solution does look like it will work, so I will mark it as the answer, but due to time constraints, I can't implement it right now. Thanks again. –  Mike Dour Jan 24 '12 at 16:45
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This is an amazing answer. I'm impressed! +1 –  Przemek Jun 1 at 20:56

Here are some academic papers discussing solutions to this problem;

A Linear-Time Approximation Algorithm for Minimum Rectangular Covering (this is for covering polygons so it is a more general case than what you have presented here).

Optimal Rectangle Covers for Convex Rectinlinear Polygons (this is one is more along the lines of your specific problem)

You can also try here for a bibliography of more papers on this subject.

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Thanks. The first link you posted seems to be for hole-free polygons. But the rectangles in my problem union-ed together can have holes. The second link is for convex rectilinear polygons, which doesn't help in my case either, because again, the union of my rectangles can have holes and can be non-convex. You definitely pointed me in the right direction though. I found this link: ndssl.vbi.vt.edu/people/vskumar/publications/J8.pdf, which seems to be more along the lines of what I'm looking for. However, it has no pseudo code, so it will take me a while to understand and code it. –  Mike Dour May 7 '11 at 7:12
    
In that case I believe your problem is NP-Hard from what I have been able to find on the web. You might want to try looking at this presentation, which discusses holes in rectilinear shapes: http:/www.utdallas.edu/~dzdu/cs7301/chapter5-1.ppt –  Jason Moore May 7 '11 at 14:59

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