3

Having list of rectangles parallel to axis in form (minx, miny, maxx, maxy):

rectangles = [
    Rectangle(90,40,110,70),
    Rectangle(10,40,40,70),
    Rectangle(75,60,95,80),
    Rectangle(30,20,60,50),
    Rectangle(100,20,130,50),
    Rectangle(70,10,85,40)
]

I need to get list of groups of rectangles, where each rectangle intersects with at least one other:

[
    (Rectangle(10,40,40,70), Rectangle(30,20,60,50)), 
    (Rectangle(70,10,85,40)), 
    (Rectangle(75,60,95,80), Rectangle(90,40,110,70), Rectangle(100,20,130,50))
]

The algorithm can't be naive, it needs to be fast.

What I tried:

  1. Find python interval tree implementation - I couldn't find anything good...
  2. I tried this repo: https://github.com/booo/rectangleintersection/blob/master/rectangleIntersection.py, it works with the example above but fails with real world data.
  3. I read through scikit image and Shapely documentation but didn't find algorithms for rectangle intersection.
  • what are the four values in each rectangle? definitely not a point in a 2D plane. – Pham Trung Jan 7 '14 at 11:50
  • @PhamTrung: minx, miny, max, maxy – mnowotka Jan 7 '14 at 11:52
  • So these rectangles are parallel with Ox and Oy axis? – Pham Trung Jan 7 '14 at 11:53
  • @richsilv - 1. Each rectangle intersects with at least one other. 2. By fast I mean faster than O^2 as I can do it comparing each rectangle with another. In ideal case it should have O complexity as good as in theory. – mnowotka Jan 7 '14 at 11:54
  • @PhamTrung - yes – mnowotka Jan 7 '14 at 11:54
3

Intersecting rectangles can be viewed as connected nodes in a graph, and sets of "transitively" intersecting rectangles as Connected Components. To find out which rectangles intersect, we first do a Plane Sweep. To make this reasonably fast we need an Interval Tree. Banyan provides one:

from collections import defaultdict
from itertools import chain
from banyan import SortedDict, OverlappingIntervalsUpdator

def closed_regions(rects):

    # Sweep Line Algorithm to set up adjacency sets:
    neighbors = defaultdict(set)
    status = SortedDict(updator=OverlappingIntervalsUpdator)
    events = sorted(chain.from_iterable(
            ((r.left, False, r), (r.right, True, r)) for r in set(rects)))
    for _, is_right, rect in events:
        for interval in status.overlap(rect.vertical):
            neighbors[rect].update(status[interval])
        if is_right:
            status.get(rect.vertical, set()).discard(rect)
        else:
            status.setdefault(rect.vertical, set()).add(rect)

    # Connected Components Algorithm for graphs:
    seen = set()
    def component(node, neighbors=neighbors, seen=seen, see=seen.add):
        todo = set([node])
        next_todo = todo.pop
        while todo:
            node = next_todo()
            see(node)
            todo |= neighbors[node] - seen
            yield node
    for node in neighbors:
        if node not in seen:
            yield component(node)

rect.vertical BTW is the tuple (rect.top, rect.bottom).

Time complexity is O(n log n + k), where n is the number of rectangles and k the number of actual intersections. So it's pretty close to optimal.

edit: Because there was some confusion, I need to add that the rectangles are expected to have left <= right and top <= bottom. IOW, the origin of the coordinate system they are in is in the upper left corner, not in the lower left corner as is usual in geometry.

  • Thanks, I will definitely give it a try! – mnowotka Jan 31 '14 at 8:21
  • What can I say, it doesn't work... gist.github.com/mnowotka/8729240 – mnowotka Jan 31 '14 at 9:54
  • Regarding your link: horizontal should be (self.left, self.right). But the main problem is that my code assumes a computer graphics coordinate system where the origin is in the upper left corner, not the lower left corner like in mathematical geometry. So the parameter list of Rectanle.__init__() should be self, left, top, right, bottom, with left <= right and top <= bottom. I tested it like so and it seems to work. – pillmuncher Jan 31 '14 at 12:50
  • Also, closed_regions() returns an iterator of iterators, so you should print(list(region)). – pillmuncher Jan 31 '14 at 12:53
  • BTW, you could also change the definition of vertical to (self.bottom, self.top). Then you could keep the origin of the coordinate system in the lower left corner. – pillmuncher Jan 31 '14 at 13:02

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