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I'm checking if two strings a and b are permutations of each other, and I'm wondering what the ideal way to do this is in Python. From the Zen of Python, "There should be one -- and preferably only one -- obvious way to do it," but I see there are at least two ways:

sorted(a) == sorted(b)


all(a.count(char) == b.count(char) for char in a)

but the first one is slower when (for example) the first char of a is nowhere in b, and the second is slower when they are actually permutations.

Is there any better (either in the sense of more Pythonic, or in the sense of faster on average) way to do it? Or should I just choose from these two depending on which situation I expect to be most common?

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i don't think that quote is not meant to be applied to algorithms, but how many ways there are to implement one specific algorithm. – hop Dec 28 '08 at 20:30
Hop is right. The rule applies to the python command set, not your actual code. For example, there are several libraries that do similar math routines. – Soviut Dec 29 '08 at 7:08
Second way is broken, eg for a="cat" and b="pact" – John La Rooy Oct 6 '12 at 12:16
Like @gnibbler pointed out, the second option is incorrect because you're only iterating over the characters of one string and comparing the frequency of those characters. There may be characters in the other string that you're not counting. You can compare the length first and continue if it's equal, or a better alternative IMO is to use a dictionary where the keys are the characters and the values are the character's frequency. – Dennis Nov 10 '13 at 22:26

14 Answers 14

up vote 6 down vote accepted

heuristically you're probably better to split them off based on string size.


returnvalue = false
if len(a) == len(b)
   if len(a) < threshold
      returnvalue = (sorted(a) == sorted(b))
       returnvalue = naminsmethod(a, b)
return returnvalue

If performance is critical, and string size can be large or small then this is what I'd do.

It's pretty common to split things like this based on input size or type. Algorithms have different strengths or weaknesses and it would be foolish to use one where another would be better... In this case Namin's method is O(n), but has a larger constant factor than the O(n log n) sorted method.

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Good plan, in my tests Namin's method becomes faster for string lengths over 1 million. All my strings are shorter than that, so I will use sorted for now and keep Namin's in mind. – Kiv Dec 28 '08 at 20:08
Instead of setting returnvalue, just return. – recursive Dec 28 '08 at 21:22
The worst case for timsort is O(nlog(n)). Whereever you have partially sorted "runs" the performance is better. Since you can't have a million different _bytes_, the performance should be somewhat better than O(nlog(n)). For Python3 where strings are unicode the the situation isn't quite as good, but for long enough strings you should still see a reduction in the number of comparisions. – John La Rooy Nov 10 '13 at 22:33

"but the first one is slower when (for example) the first char of a is nowhere in b".

This kind of degenerate-case performance analysis is not a good idea. It's a rat-hole of lost time thinking up all kinds of obscure special cases.

Only do the O-style "overall" analysis.

Overall, the sorts are O( n log( n ) ).

The a.count(char) for char in a solution is O( n 2 ). Each count pass is a full examination of the string.

If some obscure special case happens to be faster -- or slower, that's possibly interesting. But it only matters when you know the frequency of your obscure special cases. When analyzing sort algorithms, it's important to note that a fair number of sorts involve data that's already in the proper order (either by luck or by a clever design), so sort performance on pre-sorted data matters.

In your obscure special case ("the first char of a is nowhere in b") is this frequent enough to matter? If it's just a special case you thought of, set it aside. If it's a fact about your data, then consider it.

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this makes a great point. – Horace Loeb Dec 28 '08 at 19:06
+1 for average and edge case elaboration. – JV. Dec 28 '08 at 19:11
Note that the first one is actually incorrect when b contains characters not in a (see Nick's answer). Thinking of all possible "degenerate" and "obscure special cases" is important for correctness. :) – ShreevatsaR Dec 30 '08 at 1:38
@ShreegatsaR: Correctness is unrelated to performance. I'm not addressing correctness in saying that obscure special cases don't matter. I'm specifically addressing performance and only performance. – S.Lott Dec 30 '08 at 2:28
I'm pretty sure you can make the counting of characters O(n) by doing some bucket counting with an array of size 26. Then you can probably do the inverse for string b and return true iff each of the 26 indices in the array is 0. Totally O(n) where n is len(a) + len(b), or len(a) + len(b) + 26 ops. – Pål GD Jan 8 '09 at 23:51

Here is a way which is O(n), asymptotically better than the two ways you suggest.

import collections

def same_permutation(a, b):
    d = collections.defaultdict(int)
    for x in a:
        d[x] += 1
    for x in b:
        d[x] -= 1
    return not any(d.itervalues())

## same_permutation([1,2,3],[2,3,1])
#. True

## same_permutation([1,2,3],[2,3,1,1])
#. False
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for Python 3.0, replace .itervalues() with just .values() – Lasse V. Karlsen Dec 28 '08 at 17:53
This is significantly longer and more complex than necessary and turns out to be slower in every case I tested than the simple "sorted" solution. I can't find anything "better" about it. – Robert Gamble Dec 28 '08 at 17:58
I was going to ask HAVE YOU MEASURED?? Thanks, Robert. – Norman Ramsey Dec 28 '08 at 18:14
Actually, when you run it against 20,000,000 characters, namin's version is 50% faster. So if you're looking for permutations in Finnish, it might be worth a look :) – James Brady Dec 28 '08 at 18:30
As namin said, it is asymptotically better - and you do not need to measure, just to demonstrate that it is O(n) against O(n log(n)). – Roberto Liffredo Dec 28 '08 at 20:05

I think the first one is the "obvious" way. It is shorter, clearer, and likely to be faster in many cases because Python's built-in sort is highly optimized.

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But complexity is more important for large strings. – PythonPower Dec 29 '08 at 21:54
Um, the first solution has a smaller time complexity than the second one... – Robert Gamble Dec 29 '08 at 22:18

Your second example won't actually work:

all(a.count(char) == b.count(char) for char in a)

will only work if b does not contain extra characters not in a. It also does duplicate work if the characters in string a repeat.

If you want to know whether two strings are permutations of the same unique characters, just do:

set(a) == set(b)

To correct your second example:

all(str1.count(char) == str2.count(char) for char in set(a) | set(b))

set() objects overload the bitwise OR operator so that it will evaluate to the union of both sets. This will make sure that you will loop over all the characters of both strings once for each character only.

That said, the sorted() method is much simpler and more intuitive, and would be what I would use.

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Thanks! I didn't realize you could do the operator overloading, but now I see in the docs there are a bunch of overloaded operators too. – Kiv Dec 28 '08 at 19:51

Here are some timed executions on very small strings, using two different methods:
1. sorting
2. counting (specifically the original method by @namin).

a, b, c = 'confused', 'unfocused', 'foncused'

sort_method = lambda x,y: sorted(x) == sorted(y)

def count_method(a, b):
    d = {}
    for x in a:
        d[x] = d.get(x, 0) + 1
    for x in b:
        d[x] = d.get(x, 0) - 1
    for v in d.itervalues():
        if v != 0:
            return False
    return True

Average run times of the 2 methods over 100,000 loops are:

non-match (string a and b)

$ python -m timeit -s 'import temp' 'temp.sort_method(temp.a, temp.b)'
100000 loops, best of 3: 9.72 usec per loop
$ python -m timeit -s 'import temp' 'temp.count_method(temp.a, temp.b)'
10000 loops, best of 3: 28.1 usec per loop

match (string a and c)

$ python -m timeit -s 'import temp' 'temp.sort_method(temp.a, temp.c)'
100000 loops, best of 3: 9.47 usec per loop
$ python -m timeit -s 'import temp' 'temp.count_method(temp.a, temp.c)'
100000 loops, best of 3: 24.6 usec per loop

Keep in mind that the strings used are very small. The time complexity of the methods are different, so you'll see different results with very large strings. Choose according to your data, you may even use a combination of the two.

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The set method will return true for "aa" and "a" where the other methods will not. This is probably the best solution if this is the desired behavior, the sorted solution is probably the best one if it is not. – Robert Gamble Dec 28 '08 at 18:04
@Robert: its not set() alone its "set() and len()", so "aa" and "a" will return False in the first method. – JV. Dec 28 '08 at 18:13
@Norman: agreed. But still I will leave the answer for comparing the rest of the two methods. – JV. Dec 28 '08 at 18:20
@Norman: removed the set_n_len method and left the comparison of the other two in place. Marked as community wiki – JV. Dec 28 '08 at 18:22
@JV: thanks; deleted my comment – Norman Ramsey Dec 29 '08 at 2:00

Go with the first one - it's much more straightforward and easier to understand. If you're actually dealing with incredibly large strings and performance is a real issue, then don't use Python, use something like C.

As far as the Zen of Python is concerned, that there should only be one obvious way to do things refers to small, simple things. Obviously for any sufficiently complicated task, there will always be zillions of small variations on ways to do it.

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The sorted function is written in optimized C so performance shouldn't be an issue. – Robert Gamble Dec 28 '08 at 18:01

Sorry that my code is not in Python, I have never used it, but I am sure this can be easily translated into python. I believe this is faster than all the other examples already posted. It is also O(n), but stops as soon as possible:

public boolean isPermutation(String a, String b) {
    if (a.length() != b.length()) {
        return false;

    int[] charCount = new int[256];
    for (int i = 0; i < a.length(); ++i) {

    for (int i = 0; i < b.length(); ++i) {
        if (--charCount[b.charAt(i)] < 0) {
            return false;
    return true;

First I don't use a dictionary but an array of size 256 for all the characters. Accessing the index should be much faster. Then when the second string is iterated, I immediately return false when the count gets below 0. When the second loop has finished, you can be sure that the strings are a permutation, because the strings have equal length and no character was used more often in b compared to a.

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This is actually slower in Python than sorted(), Namin's, or JF's. (As well as restricted to ASCII.) The main problem is in Java you can say charCount['a'] and it will automatically cast the char to an integer for you; in Python you have to use a lot of calls to ord() instead. – Kiv Jan 2 '09 at 23:01
oh, I did not know that. In Java this code would probably be the fastest. – martinus Jan 3 '09 at 11:03

Here's martinus code in python. It only works for ascii strings:

def is_permutation(a, b):
    if len(a) != len(b):
        return False

    char_count = [0] * 256
    for c in a:
        char_count[ord(c)] += 1

    for c in b:
        char_count[ord(c)] -= 1
        if char_count[ord(c)] < 0:
            return False

    return True
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I did a pretty thorough comparison in Java with all words in a book I had. The counting method beats the sorting method in every way. The results:

Testing against 9227 words.

Permutation testing by sorting ... done.    	18.582 s
Permutation testing by counting ... done.   	14.949 s

If anyone wants the algorithm and test data set, comment away.

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i.e. 85137529 comparisons of 9227 unique words – Pål GD Jan 9 '09 at 0:33

In Python 3.1/2.7 you can just use collections.Counter(a) == collections.Counter(b).

But sorted(a) == sorted(b) is still the most obvious IMHO. You are talking about permutations - changing order - so sorting is the obvious operation to erase that difference.

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That builds two dicts; Namin's method uses only one. – John Machin Jan 7 '10 at 22:27
@John Machin: true, but unless it's unicode, the dicts are no bigger then 256 entries, so who cares? Since the counting loop is done in C, it's likely to be faster [not tested]. – Beni Cherniavsky-Paskin Jan 9 '10 at 20:29
collections.Counter looks simpler but it performs a lot worse than the "sorted" method, at least from what I'm seeing on Python 3.1 on Windows, with relatively short strings – Ricardo Reyes Jun 28 '10 at 18:52
@RicardoReyes I haven't done any measurements, but it's possible that situation might have changed since Python 3.3 is much better performance-wise than any previous 3.x release according to Guido. – Dennis Nov 10 '13 at 22:22
@RicardoReyes I think you'll only notice a difference when the strings are very large. The sorting solution is O(n log n) while the dictionary solution is O(n), no? – Dennis Nov 10 '13 at 22:24

This is a PHP function I wrote about a week ago which checks if two words are anagrams. How would this compare (if implemented the same in python) to the other methods suggested? Comments?

public function is_anagram($word1, $word2) {
    $letters1 = str_split($word1);
    $letters2 = str_split($word2);
    if (count($letters1) == count($letters2)) {
        foreach ($letters1 as $letter) {
            $index = array_search($letter, $letters2);
            if ($index !== false) {
            else { return false; }
        return true;
    return false;        

Here's a literal translation to Python of the PHP version (by JFS):

def is_anagram(word1, word2):
    letters2 = list(word2)
    if len(word1) == len(word2):
       for letter in word1:
               del letters2[letters2.index(letter)]
           except ValueError:
               return False               
       return True
    return False


    1. The algorithm is O(N**2). Compare it to @namin's version (it is O(N)).
    2. The multiple returns in the function look horrible.
share|improve this answer
I've added a Python version. – J.F. Sebastian Dec 29 '08 at 3:30
Yeah, I didn't like the multiple returns either. For what I had in mind I wanted a quick escape if false and didn't really know how to refactor that part. – Josh Smeaton Dec 29 '08 at 3:55
del letters2[letters2.index(letter)] should be written as letters2.remove(letter) – user102008 Jan 19 '11 at 8:16

This version is faster than any examples presented so far except it is 20% slower than sorted(x) == sorted(y) for short strings. It depends on use cases but generally 20% performance gain is insufficient to justify a complication of the code by using different version for short and long strings (as in @patros's answer).

It doesn't use len so it accepts any iterable therefore it works even for data that do not fit in memory e.g., given two big text files with many repeated lines it answers whether the files have the same lines (lines can be in any order).

def isanagram(iterable1, iterable2):
    d = {}
    get = d.get
    for c in iterable1:
        d[c] = get(c, 0) + 1
        for c in iterable2:
            d[c] -= 1
        return not any(d.itervalues())
    except KeyError:
        return False

It is unclear why this version is faster then defaultdict (@namin's) one for large iterable1 (tested on 25MB thesaurus).

If we replace get in the loop by try: ... except KeyError then it performs 2 times slower for short strings i.e. when there are few duplicates.

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I think it's because if we find a letter in B that is not in A, yours returns False early whereas Namin's always examines all of both iterables. – Kiv Dec 30 '08 at 21:30
@Kiv: I've checked it when both A and B has the same letters (but maybe different number of them; in this case KeyError never raises) and still the variant with an ordinary dictionary is faster than defauldict' one. – J.F. Sebastian Dec 31 '08 at 6:40

This is derived from @patros' answer.

from collections import Counter

def is_anagram(a, b, threshold=1000000):
    """Returns true if one sequence is a permutation of the other.

    Ignores whitespace and character case.
    Compares sorted sequences if the length is below the threshold,
    otherwise compares dictionaries that contain the frequency of the
    a, b = a.strip().lower(), b.strip().lower()
    length_a, length_b = len(a), len(b)
    if length_a != length_b:
        return False
    if length_a < threshold:
        return sorted(a) == sorted(b)
    return Counter(a) == Counter(b)  # Or use @namin's method if you don't want to create two dictionaries and don't mind the extra typing.
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