By which I mean a structure with:

  • O(log n) complexity for x.push() operations
  • O(log n) complexity to find an element
  • O(n) complexity to compute list(x) which will be sorted

I also had a related question about performance of list(...).insert(...) which is now here.

  • memcpy is still a O(n) operation. I am not sure how Python implements lists exactly, but my bet would be that they are stored in contiguous memory (certainly not as a linked list). If that is indeed so, the insertion using bisect which you demonstrate will have complexity O(n).
    – Stephan202
    Jul 10, 2009 at 15:38
  • 3
    Sadly not out the box. But Grant Jenk's sortedcontainers library is excellent. stackoverflow.com/a/22616929/284795 Jul 28, 2015 at 15:31
  • In many cases you can predict maximum number of elements, in which case you can preallocate memory once and never need memcpy afterwards. Mar 4 at 22:52

9 Answers 9


Is there a particular reason for your big-O requirements? Or do you just want it to be fast? The sortedcontainers module is pure-Python and fast (as in fast-as-C implementations like blist and rbtree).

The performance comparison shows it benchmarks faster or on par with blist's sorted list type. Note also that rbtree, RBTree, and PyAVL provide sorted dict and set types but don't have a sorted list type.

If performance is a requirement, always remember to benchmark. A module that substantiates the claim of being fast with Big-O notation should be suspect until it also shows benchmark comparisons.

Disclaimer: I am the author of the Python sortedcontainers module.


pip install sortedcontainers


>>> from sortedcontainers import SortedList
>>> l = SortedList()
>>> l.update([0, 4, 1, 3, 2])
>>> l.index(3)
>>> l.add(5)
>>> l[-1]
  • 7
    Indeed I compared sortedcontainers against bisect: 0.0845024989976 for SortedList.add() vs 0.596589182518 for bisect.insort(), thus a difference of 7x in speed! And I expect the speed gap to increase with the list length since sortedcontainers insertion sort works in O(log n) while bisect.insort() in O(n).
    – gaborous
    Jul 19, 2015 at 14:13
  • 1
    @gaborous because bisect still uses a list, so the insertion remains O(n)
    – njzk2
    May 18, 2017 at 19:03
  • Just a 5 cents: If one needs to sort objects from custom class, use SortedList's subclass, called SortedKeyList.
    – Andrey
    Dec 8, 2022 at 4:12
  • Presumably, the reason for the big-O requirements is specifically that they imply either a balanced binary tree representation or equivalent. Feb 10, 2023 at 16:59

The standard Python list is not sorted in any form. The standard heapq module can be used to append in O(log n) to an existing list and remove the smallest one in O(log n), but isn't a sorted list in your definition.

There are various implementations of balanced trees for Python that meet your requirements, e.g. rbtree, RBTree, or pyavl.

  • 2
    +1 for rbtree, it works very well (but contains native code; not pure python, not so easy to deploy perhaps)
    – Will
    May 13, 2011 at 12:34
  • 13
    sortedcontainers is pure-Python and fast-as-C (like rbtree) with a performance comparison.
    – GrantJ
    Mar 27, 2014 at 17:32
  • "isn't a sorted list in your definition." How so? Jul 28, 2015 at 15:36
  • 6
    heapq only allows to find the smallest element; the OP was asking for a structure that can find any element in O(log n), which heaps are not. Aug 7, 2015 at 17:27

Though I have still never checked the "big O" speeds of basic Python list operations, the bisect standard module is probably also worth mentioning in this context:

import bisect
L = [0, 100]

bisect.insort(L, 50)
bisect.insort(L, 20)
bisect.insort(L, 21)

print L
## [0, 20, 21, 50, 100]

i = bisect.bisect(L, 20)
print L[i-1], L[i]
## 20, 21

PS. Ah, sorry, bisect is mentioned in the referenced question. Still, I think it won't be much harm if this information will be here )

PPS. And CPython lists are actually arrays (not, say, skiplists or etc) . Well, I guess they have to be something simple, but as for me, the name is a little bit misleading.

So, if I am not mistaken, the bisect/list speeds would probably be:

  • for a push(): O(n) for the worst case ;
  • for a search: if we consider the speed of array indexing to be O(1), search should be an O(log(n)) operation ;
  • for the list creation: O(n) should be the speed of the list copying, otherwise it's O(1) for the same list )

Upd. Following a discussion in the comments, let me link here these SO questions: How is Python's List Implemented and What is the runtime complexity of python list functions

  • push() should be in O(log n) since the list is already sorted.
    – estani
    Apr 11, 2012 at 12:05
  • 1
    may be I should have said "for an insert op". anyway, that was about a year ago so now I can easily mix things up or miss something Apr 13, 2012 at 4:53
  • You can always insert a value into a sorted list in O(log n), see binary search. push() is defined as an insert operation.
    – estani
    Apr 16, 2012 at 16:29
  • 4
    True. But while finding the insert location would indeed take O(log n) ops, the actual insert (i.e. adding the element to the data structure) probably depends on that structure (think inserting an element in a sorted array). And as Python lists are actually arrays, this may take O(n). Due to the size limit for the comments, I will link two related SO questions from the text of the answer (see above). Apr 22, 2012 at 0:35
  • Good argument. I wasn't aware list where handled as arrays in Python.
    – estani
    Apr 23, 2012 at 12:57

Though it does not (yet) provide a custom search function, the heapq module may suit your needs. It implements a heap queue using a regular list. You'd have to write your own efficient membership test that makes use of the queue's internal structure (that can be done in O(log n), I'd say...). There is one downside: extracting a sorted list has complexity O(n log n).

  • It's nice but hard to bisect.
    – ilya n.
    Jul 10, 2009 at 15:46
  • 3
    How can there be an O(log n) membership test in a heap? If you are looking for value x, you can stop looking down a branch if you find something larger than x, but for a random value of x it is 50% likely to be at a leaf, and you probably can't prune much.
    – markets
    Nov 12, 2010 at 15:06
import bisect

class sortedlist(list):
    '''just a list but with an insort (insert into sorted position)'''
    def insort(self, x):
        bisect.insort(self, x)
  • 1
    the implied insert() in bisect.insort() is O(n)
    – j314erre
    Jun 15, 2019 at 16:27

An AVL Tree coupled with in-order traversal will solve this problem in the required time complexity.


It may not be hard to implement your own sortlist on Python. Below is a proof of concept:

import bisect

class sortlist:
    def __init__(self, list):
        self.list = list
    def sort(self):
        l = []
        for i in range(len(self.list)):
            bisect.insort(l, self.list[i])
        self.list = l
        self.len = i
    def insert(self, value):
        bisect.insort(self.list, value)
        self.len += 1
    def show(self):
        print self.list
    def search(self,value):
        left = bisect.bisect_left(self.list, value)
        if abs(self.list[min([left,self.len-1])] - value) >= abs(self.list[left-1] - value):
            return self.list[left-1]
            return self.list[left]

list = [101, 3, 10, 14, 23, 86, 44, 45, 45, 50, 66, 95, 17, 77, 79, 84, 85, 91, 73]
slist = sortlist(list)
print slist.search(100000000)
print slist.search(0)
print slist.search(56.7)

========= Results ============

[3, 10, 14, 17, 23, 44, 45, 45, 50, 66, 73, 77, 79, 84, 85, 86, 91, 95, 101]

[3, 10, 14, 17, 23, 44, 45, 45, 50, 66, 73, 77, 79, 84, 85, 86, 91, 95, 99, 101]




  • 1
    This is still based on insort, which has O(n) time complexity.
    – trincot
    Jan 11, 2022 at 15:29

Use the standard library bisect module or the third-party sortedcontainers package. Alternately, the heapq module solves the problem by implementing a heap queue.


Interesting case: if your list L is already sorted (for example because you appended them in a sorted order), you can benefit from a fast lookup in O(log n) with a standard Python list with this method:

import bisect
def in_sorted_list(elem, sorted_list):
    i = bisect.bisect_left(sorted_list, elem)
    return i != len(sorted_list) and sorted_list[i] == elem
L = ["aaa", "bcd", "hello", "world", "zzz"]
print(in_sorted_list("hellu", L))       # False

More details in this answer.

  • This information was already covered repeatedly by existing answers. Feb 10, 2023 at 17:05

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