How to determine if two strings are permutations of each other

Edit: The above method is reasonably efficient  O(n*log(n)) and, as others have shown, very easy to implement using the standard Java API. Even more efficient (but also more work) would be counting and comparing the occurrence of each character, using the char value as index into an array of counts. I do not thing there is an efficient way to do it recursively. An inefficient way (O(n^2), worse if implemented straightforwardly) is this:



To put @Michael Borgwardt's words in to code:



Create a Hashmap with the characters of the first string as keys and the number of occurances as value; then go through the second string and for each character, look up the hash table and decrement the number if it is greater than zero. If you don't find an entry or if it is already 0, the strings are not a permutation of each other. Obviously, the string must have the same length. 





You might take a look at String.toCharArray and Arrays.sort 


First you check the lengths ( EDIT with code snippet :



You can try to use XOR, if one string is a permeation of the other, they should have essentially identical chars. The only difference is just the order of chars. Therefore using XOR trick can help you get rid of the order and focus only on the chars.



I did this, and it works well and quickly:



I'm working on a Java library that should simplify your task. You can reimplement this algorithm using only two method calls:
testcase
PSIn the case you can clone the souces at bitbucket. 


The obligatory Guava oneliner:
(Just for fun. I don't recommend submitting this for your assignment.) 


As you requested, here's a complete solution using recursion. Now all you have to do is:
Good luck :)



I did it using C#






} 


I did this in C if anyone cares. It assumes ASCII values and uses the characters ordinal value:


