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

rectangles = [

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(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

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):
        if is_right:
            status.get(rect.vertical, set()).discard(rect)
            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()
            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

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.