# What is the space complexity of the python sort?

What space complexity does the python sort take? I can't find any definitive documentation on this anywhere

Space complexity is defined as how much additional space the algorithm needs in terms of the `N` elements. And even though according to the docs, the `sort` method sorts a list in place, it does use some additional space, as stated in the description of the implementation:

timsort can require a temp array containing as many as N//2 pointers, which means as many as 2*N extra bytes on 32-bit boxes. It can be expected to require a temp array this large when sorting random data; on data with significant structure, it may get away without using any extra heap memory.

Therefore the worst case space complexity is `O(N)` and best case `O(1)`

• Well, you sure are sorting something that takes space in memory. Feb 13, 2018 at 4:13
• Yeah you certainly are, but space complexity is measured in additional memory needed so not the array itself. Nevertheless, I took a look at the implementation description and turns our they do use some more additional space for implementing the algorithm. My answer is updated accordingly Feb 13, 2018 at 4:38

Python's built in sort method is a spin off of merge sort called Timsort, more information here - https://en.wikipedia.org/wiki/Timsort.

It's essentially no better or worse than merge sort, which means that its run time on average is `O(n log n)` and its space complexity is `Ω(n)`

• ... that doesn't answer the question. Feb 13, 2018 at 3:56