# What is the complexity of the sorted() function?

I have a list of lists and I am sorting them using the following

``````data=sorted(data, key=itemgetter(0))
``````

Was wondering what is the runtime complexity of this python function?

• The same as of a simple `sorted`. Jan 21, 2013 at 8:01
• `O(n log n)` like just about every other comparison sort used in a language library. Jan 21, 2013 at 8:01
• en.wikipedia.org/wiki/Timsort
– root
Jan 21, 2013 at 8:01
• Timsort is a kind of adaptive sorting algorithm based on merge sort and insertion sort, then I thought it belongs to the comparison sort and no comparison sort can guarantee a time complexity smaller than lg(N!) ~ N log N. Oct 9, 2018 at 2:39
• @mblakesley see, for example (PDF warning) here. Any comparison-based sort must take at least `O(n log n)`. Without knowledge of the data and a specialized sort to take advantage of that (e.g. radix sort), this is the bound. It's not much of a stretch to say that a general (comparison-based) sort in a standard library will have this complexity bound. Sep 16, 2022 at 1:26

Provided `itemgetter(0)` is `O(1)` when used with `data`, the sort is `O(n log n)` both on average and in the worst case.

For more information on the sorting method used in Python, see Wikipedia.

• And if you know the complexity of `itemgetter(0)` and it's not `O(1)` then you can still work out the overall complexity: `sorted` makes `n` calls to `itemgetter(0)` plus what you say. Jan 21, 2013 at 8:53
• Doesn't Timsort have a best case of O(N). Jan 22, 2013 at 2:41
• @MC: It does. However, that's hardly relevant for practical use. Besides, any sorting algorithm can be made to have `O(n)` best case.
– NPE
Jan 22, 2013 at 7:47
• Relevant is also information, what is the best case. Here it is already sorted collection, which is good. So sorting already sorted array in Python should take O(n) time. Apr 30, 2018 at 19:50

sorted is like sort except that the first builds a new sorted list from an iterable while sort do sort in place. The main difference will be space complexity.

It is the Timsort, and Timsort is a kind of adaptive sorting algorithm based on merge sort and insertion sort, then I thought it belongs to the comparison sort, and it's said, no comparison sort can guarantee a time complexity smaller than lg(N!) ~ N log N.

The time complexity in the average case would be `O(nlog(n))`