# Why is Python list slower when sorted?

In the following code, I create two lists with the same values: one list unsorted (s_not), the other sorted (s_yes). The values are created by randint(). I run some loop for each list and time it.

``````import random
import time

for x in range(1,9):

r = 10**x # do different val for the bound in randint()
m = int(r/2)

print("For rand", r)

# s_not is non sorted list
s_not = [random.randint(1,r) for i in range(10**7)]

# s_yes is sorted
s_yes = sorted(s_not)

# do some loop over the sorted list
start = time.time()
for i in s_yes:
if i > m:
_ = 1
else:
_ = 1
end = time.time()
print("yes", end-start)

# do the same to the unsorted list
start = time.time()
for i in s_not:
if i > m:
_ = 1
else:
_ = 1
end = time.time()
print("not", end-start)

print()
``````

With output:

``````For rand 10
yes 1.0437555313110352
not 1.1074268817901611

For rand 100
yes 1.0802974700927734
not 1.1524150371551514

For rand 1000
yes 2.5082249641418457
not 1.129960298538208

For rand 10000
yes 3.145440101623535
not 1.1366300582885742

For rand 100000
yes 3.313387393951416
not 1.1393756866455078

For rand 1000000
yes 3.3180911540985107
not 1.1336982250213623

For rand 10000000
yes 3.3231537342071533
not 1.13503098487854

For rand 100000000
yes 3.311596393585205
not 1.1345293521881104
``````

So, when increasing the bound in the randint(), the loop over the sorted list gets slower. Why?

• n=10^7 might be overkill. As low as n=10^5 gives me comparable results, and only takes about 2 seconds to run. Nov 12, 2021 at 23:25
• For those attributing to cache misses: list size is the same for all `r`, but there is no difference in runtime until numbers get over 10**100 Nov 13, 2021 at 1:55
• Essentially the same issue as this Java question. Nov 13, 2021 at 13:31
• @Davislor: That would make no difference; Python's `list` is already contiguous, and sorting is done by swapping data. `sorted` doesn't do it in place (sort of; it makes a new `list`, then sorts that in place), but it's largely irrelevant; `list` is storing pointers to the various objects in it, not raw data, so both `list`s are aliasing the same objects. Nov 14, 2021 at 13:33
• @nocomment: We're both right, we're just using different contexts. Yes, internally, CPython is using TimSort (modified merge sort) that doesn't sort literally in-place, nor does it swap as it goes. I'm talking about the observable behavior from the Python layer (for `list.sort` anyway, you can't tell any of this for `sorted` since it makes the new `list` internally and you can't inspect it), where the original `list` is modified in-place, and the same objects are in it (no recreating things). If Davislor was talking about true arrays (`array` module or `numpy`) I was off-base. Nov 14, 2021 at 16:34

Cache misses. When `N` int objects are allocated back-to-back, the memory reserved to hold them tends to be in a contiguous chunk. So crawling over the list in allocation order tends to access the memory holding the ints' values in sequential, contiguous, increasing order too.

Shuffle it, and the access pattern when crawling over the list is randomized too. Cache misses abound, provided there are enough different int objects that they don't all fit in cache.

At `r==1`, and `r==2`, CPython happens to treat such small ints as singletons, so, e.g., despite that you have 10 million elements in the list, at `r==2` it contains only (at most) 100 distinct int objects. All the data for those fit in cache simultaneously.

Beyond that, though, you're likely to get more, and more, and more distinct int objects. Hardware caches become increasingly useless then when the access pattern is random.

Illustrating:

``````>>> from random import randint, seed
>>> seed(987987987)
>>> for x in range(1, 9):
...     r = 10 ** x
...     js = [randint(1, r) for _ in range(10_000_000)]
...     unique = set(map(id, js))
...     print(f"{r:12,} {len(unique):12,}")
...
10           10
100          100
1,000    7,440,909
10,000    9,744,400
100,000    9,974,838
1,000,000    9,997,739
10,000,000    9,999,908
100,000,000    9,999,998
``````
• @arne `sorted` sorts immediately. So before the loop and the timing starts. You seem to be a C++ person. Python ints are objects, and the list only stores their addresses. Think not `vector<int>` but `vector<int*>`. Reading the pointers in order is cache-friendly. But cache-friendliness of the ints they point to depends on where the ints are in memory. Nov 15, 2021 at 15:24
• @arne remembering that difference is critical to deeply understanding how Python works. Nov 15, 2021 at 17:12
• @ThomasWeller, the effect in the end would be the same: the original list would be accessed in allocation order, and after shuffling it would be accessed in "random" order of memory blocks. Nov 15, 2021 at 18:50
• I'll add that "sorted" here isn't really the fundamental driver: any way of effecting a random-ish permutation would have same end effect. In the original, because the values were themselves random-ish, sorting effected a random-ish permutation. Nov 15, 2021 at 22:55
• @arne my comment was about more than just performance. I find it useful to know how things work under the covers. You may certainly disagree and find Python perfectly usable without that knowledge, but I think you're missing out. Nov 16, 2021 at 16:43

As the others said, cache misses. Not the values/sortedness. The same sorted values, but with freshly sequentially created objects, is fast again (actually even a bit faster than the `not` case):

``````s_new = [--x for x in s_yes]
``````

Just picking one size:

``````For rand 1000000
yes 3.6270992755889893
not 1.198620080947876
new 1.02010178565979
``````

Looking at address differences from one element to the next (just 106 elements) shows that especially for `s_new`, the elements are nicely sequentially arranged in memory (99.2% of the time the next element came 32 bytes later), while for `s_yes` they're totally not (just 0.01% came 32 bytes later):

``````s_yes:
741022 different address differences occurred. Top 5:
Address difference 32 occurred 102 times.
Address difference 0 occurred 90 times.
Address difference 64 occurred 37 times.
Address difference 96 occurred 17 times.
Address difference 128 occurred 9 times.

s_not:
1048 different address differences occurred. Top 5:
Address difference 32 occurred 906649 times.
Address difference 96 occurred 8931 times.
Address difference 64 occurred 1845 times.
Address difference -32 occurred 1816 times.
Address difference -64 occurred 1812 times.

s_new:
19 different address differences occurred. Top 5:
Address difference 32 occurred 991911 times.
Address difference 96 occurred 7825 times.
Address difference -524192 occurred 117 times.
Address difference 0 occurred 90 times.
Address difference 64 occurred 37 times.
``````

Code for that:

``````from collections import Counter

for s in 's_yes', 's_not', 's_new':
print(s + ':')
ids = list(map(id, eval(s)))
ctr = Counter(j - i for i, j in zip(ids, ids[1:]))
print('   ', len(ctr), 'different address differences occurred. Top 5:')
for delta, count in ctr.most_common(5):
print(f'    Address difference {delta} occurred {count} times.')
print()
``````
• A better illustration for why this is about locality would be to make `s_yes = list(range(10**7))`, and `s_not = s_yes[:]`, `random.shuffle(s_not)`. Now the sorted array is also contiguously allocated, while the unsorted array is non-contiguous, so the timings should reverse. Nov 14, 2021 at 13:38
• @ShadowRanger Hmmm, I don't think that's "better". About equally good maybe. But it's further away from their data. Nov 14, 2021 at 14:27

The answer is likely locality of data. Integers above a certain size limit are allocated dynamically. When you create the list, the integer objects are allocated from (mostly) nearby memory. So when you loop through the list, things tend to be in cache and the hardware prefetcher can put them there.

In the sorted case, the objects get shuffled around, resulting in more cache misses.

• Most definitely. Accessing data randomly after allocating memory in a given order is slower than accessing it sequentially in the original order. Doing this in reverse shows that the sort has nothing to do with it (except by changing the access order). i.e. starting with s_yes as a range and s_not as a shuffled copy for s_yes results in longer times for s_not. Nov 13, 2021 at 1:07
• That "a certain size" is 256.
– user17242583
Nov 15, 2021 at 21:04
• @user17242583 subject to change, of course. I think it's already changed once in the past. Nov 16, 2021 at 16:42