A mutable, self-balancing interval tree for Python 2 and 3. Queries may be by point, by range overlap, or by range envelopment.
This library was designed to allow tagging text and time intervals, where the intervals include the lower bound but not the upper bound.
Version 3 changes!
- The
search(begin, end, strict)method no longer exists. Instead, use one of these:at(point)overlap(begin, end)envelop(begin, end)
- The
extend(items)method no longer exists. Instead, useupdate(items). - Methods like
merge_overlaps()which took astrictargument consistently default tostrict=True. Before, some methods defaulted toTrueand others toFalse.
pip install intervaltree-
Supports Python 2.7 and Python 3.6+ (Tested under 2.7, and 3.6 thru 3.11)
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Initializing
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tree = IntervalTree() - from an iterable of
Intervalobjects (tree = IntervalTree(intervals)) - from an iterable of tuples (
tree = IntervalTree.from_tuples(interval_tuples))
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Insertions
tree[begin:end] = datatree.add(interval)tree.addi(begin, end, data)
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Deletions
tree.remove(interval)(raisesValueErrorif not present)tree.discard(interval)(quiet if not present)tree.removei(begin, end, data)(short fortree.remove(Interval(begin, end, data)))tree.discardi(begin, end, data)(short fortree.discard(Interval(begin, end, data)))tree.remove_overlap(point)tree.remove_overlap(begin, end)(removes all overlapping the range)tree.remove_envelop(begin, end)(removes all enveloped in the range)
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Point queries
tree[point]tree.at(point)(same as previous)
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Overlap queries
tree[begin:end]tree.overlap(begin, end)(same as previous)
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Envelop queries
tree.envelop(begin, end)
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Membership queries
interval_obj in tree(this is fastest, O(1))tree.containsi(begin, end, data)tree.overlaps(point)tree.overlaps(begin, end)
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Iterable
for interval_obj in tree:tree.items()
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Sizing
len(tree)tree.is_empty()not treetree.begin()(thebegincoordinate of the leftmost interval)tree.end()(theendcoordinate of the rightmost interval)
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Set-like operations
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union
result_tree = tree.union(iterable)result_tree = tree1 | tree2tree.update(iterable)tree |= other_tree
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difference
result_tree = tree.difference(iterable)result_tree = tree1 - tree2tree.difference_update(iterable)tree -= other_tree
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intersection
result_tree = tree.intersection(iterable)result_tree = tree1 & tree2tree.intersection_update(iterable)tree &= other_tree
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symmetric difference
result_tree = tree.symmetric_difference(iterable)result_tree = tree1 ^ tree2tree.symmetric_difference_update(iterable)tree ^= other_tree
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comparison
tree1.issubset(tree2)ortree1 <= tree2tree1 <= tree2tree1.issuperset(tree2)ortree1 > tree2tree1 >= tree2tree1 == tree2
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Restructuring
chop(begin, end)(slice intervals and remove everything betweenbeginandend, optionally modifying the data fields of the chopped-up intervals)slice(point)(slice intervals atpoint)split_overlaps()(slice at all interval boundaries, optionally modifying the data field)merge_overlaps()(joins overlapping intervals into a single interval, optionally merging the data fields)merge_equals()(joins intervals with matching ranges into a single interval, optionally merging the data fields)merge_neighbors()(joins adjacent intervals into a single interval if the distance between their range terminals is less than or equal to a given distance. Optionally merges overlapping intervals. Can also merge the data fields.)
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Copying and typecasting
IntervalTree(tree)(Intervalobjects are same as those in tree)tree.copy()(Intervalobjects are shallow copies of those in tree)set(tree)(can later be fed intoIntervalTree())list(tree)(ditto)
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Pickle-friendly
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Automatic AVL balancing
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Getting started
>>> from intervaltree import Interval, IntervalTree >>> t = IntervalTree() >>> t IntervalTree()
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Adding intervals - any object works!
>>> t[1:2] = "1-2" >>> t[4:7] = (4, 7) >>> t[5:9] = {5: 9}
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Query by point
The result of a query is a
setobject, so if ordering is important, you must sort it first.>>> sorted(t[6]) [Interval(4, 7, (4, 7)), Interval(5, 9, {5: 9})] >>> sorted(t[6])[0] Interval(4, 7, (4, 7))
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Query by range
Note that ranges are inclusive of the lower limit, but non-inclusive of the upper limit. So:
>>> sorted(t[2:4]) []
Since our search was over
2 ≤ x < 4, neitherInterval(1, 2)norInterval(4, 7)was included. The first interval,1 ≤ x < 2does not includex = 2. The second interval,4 ≤ x < 7, does includex = 4, but our search interval excludes it. So, there were no overlapping intervals. However:>>> sorted(t[1:5]) [Interval(1, 2, '1-2'), Interval(4, 7, (4, 7))]
To only return intervals that are completely enveloped by the search range:
>>> sorted(t.envelop(1, 5)) [Interval(1, 2, '1-2')]
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Accessing an
Intervalobject>>> iv = Interval(4, 7, (4, 7)) >>> iv.begin 4 >>> iv.end 7 >>> iv.data (4, 7) >>> begin, end, data = iv >>> begin 4 >>> end 7 >>> data (4, 7)
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Constructing from lists of intervals
We could have made a similar tree this way:
>>> ivs = [(1, 2), (4, 7), (5, 9)] >>> t = IntervalTree( ... Interval(begin, end, "%d-%d" % (begin, end)) for begin, end in ivs ... )
Or, if we don't need the data fields:
>>> t2 = IntervalTree(Interval(*iv) for iv in ivs)
Or even:
>>> t2 = IntervalTree.from_tuples(ivs)
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Removing intervals
>>> t.remove(Interval(1, 2, "1-2")) >>> sorted(t) [Interval(4, 7, '4-7'), Interval(5, 9, '5-9')] >>> t.remove(Interval(500, 1000, "Doesn't exist")) # raises ValueError Traceback (most recent call last): ValueError >>> t.discard(Interval(500, 1000, "Doesn't exist")) # quietly does nothing >>> del t[5] # same as t.remove_overlap(5) >>> t IntervalTree()
We could also empty a tree entirely:
>>> t2.clear() >>> t2 IntervalTree()
Or remove intervals that overlap a range:
>>> t = IntervalTree([ ... Interval(0, 10), ... Interval(10, 20), ... Interval(20, 30), ... Interval(30, 40)]) >>> t.remove_overlap(25, 35) >>> sorted(t) [Interval(0, 10), Interval(10, 20)]
We can also remove only those intervals completely enveloped in a range:
>>> t.remove_envelop(5, 20) >>> sorted(t) [Interval(0, 10)]
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Chopping
We could also chop out parts of the tree:
>>> t = IntervalTree([Interval(0, 10)]) >>> t.chop(3, 7) >>> sorted(t) [Interval(0, 3), Interval(7, 10)]
To modify the new intervals' data fields based on which side of the interval is being chopped:
>>> def datafunc(iv, islower): ... oldlimit = iv[islower] ... return "oldlimit: {0}, islower: {1}".format(oldlimit, islower) >>> t = IntervalTree([Interval(0, 10)]) >>> t.chop(3, 7, datafunc) >>> sorted(t)[0] Interval(0, 3, 'oldlimit: 10, islower: True') >>> sorted(t)[1] Interval(7, 10, 'oldlimit: 0, islower: False')
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Slicing
You can also slice intervals in the tree without removing them:
>>> t = IntervalTree([Interval(0, 10), Interval(5, 15)]) >>> t.slice(3) >>> sorted(t) [Interval(0, 3), Interval(3, 10), Interval(5, 15)]
You can also set the data fields, for example, re-using
datafunc()from above:>>> t = IntervalTree([Interval(5, 15)]) >>> t.slice(10, datafunc) >>> sorted(t)[0] Interval(5, 10, 'oldlimit: 15, islower: True') >>> sorted(t)[1] Interval(10, 15, 'oldlimit: 5, islower: False')
See the issue tracker on GitHub.
- Eternally Confuzzled's AVL tree
- Wikipedia's Interval Tree
- Heavily modified from Tyler Kahn's Interval Tree implementation in Python (GitHub project)
- Incorporates contributions from:
- konstantint/Konstantin Tretyakov of the University of Tartu (Estonia)
- siniG/Avi Gabay
- lmcarril/Luis M. Carril of the Karlsruhe Institute for Technology (Germany)
- depristo/MarkDePristo
- Chaim Leib Halbert, 2013-2023
- Modifications, Konstantin Tretyakov, 2014
Licensed under the Apache License, version 2.0.
The source code for this project is at https://github.com/chaimleib/intervaltree
