# top down ranges merge?

I want to merge some intervals like this:

``````>>> ranges = [(30, 45), (40, 50), (10, 50), (60, 90), (90, 100)]
>>> merge(ranges)
[(10, 50), (60, 100)]
``````

I'm not in cs field. I know how to do it by iteration, but wonder if there's a more efficient "top-down" approach to merge them more efficiently, maybe using some special data structure?

Thanks.

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Yeah, the efficient way to do it is to use an interval tree.

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Hi Jason, I just looked up interval tree, and got the basic idea. But I'm confused about how to use that to merge intervals, could you give me a brief description of the missing link here? Thank you. –  Jingping Feb 24 '12 at 21:00
The only thing I can think of is to construct the interval tree, and then sort the intervals and use the leftmost interval as first query, search for the tree and get all intersecting intervals, then merge those, and do this iteratively until the merged range doesn't change; and then use the next right interval to start the second round of the scan. Is this the correct way to scan the whole tree for all the "subtrees" of overlapping intervals? –  Jingping Feb 24 '12 at 22:19

Interval tree definitely works, but it is more complex than what you need. Interval tree is an "online" solution, and so it allows you to add some intervals, look at the union, add more intervals, look again, etc.

If you have all the intervals upfront, you can do something simpler:

ranges = [(30, 45), (40, 50), (10, 50)]

2. Convert the range list into a list of endpoints. If you have range (A, B), you'll convert it to two endpoints: (A, 0) will be the left endpoint and (B, 1) wil be the right endpoint.

endpoints = [(30, 0), (45, 1), (40, 0), (50, 1), (10, 0), (50, 1)]

3. Sort the endpoints

endpoints = [(10, 0), (30, 0), (40, 0), (45, 1), (50, 1), (50, 1)]

4. Scan forward through the endpoints list. Increment a counter when you see a left endpoint and decrement the counter when you see a right endpoint. Whenever the counter hits 0, you close the current merged interval.

This solution can be implemented in a few lines.

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would this work if there are more than one cluster of overlapping intervals? –  Jingping Feb 24 '12 at 22:16
I really like the elegant idea though :) –  Jingping Feb 24 '12 at 22:24
Yes, it works no matter how many clusters there are. Each time the counter reaches zero, you reached the end of a merged cluster. The next endpoint must be a left endpoint (or else your data got messed up), and it will start the next merged cluster. –  Igor ostrovsky Feb 24 '12 at 23:19
I see it now, even though I think this should have similar time complexity as the sort and pairwise merge approach, right? –  Jingping Feb 25 '12 at 2:56
True - you can sort the intervals based on the left endpoint and then iterate forwards, merging intervals if they overlap. Honestly, I didn't think of that approach :) –  Igor ostrovsky Feb 25 '12 at 3:40