Checking if two strings are permutations of each other

How to determine if two strings are permutations of each other

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n1b-algo.blogspot.com/2009/01/string-permutations.html try to analyze this. It uses recursion to print all the permutations –  Tech Jerk Jan 27 '10 at 12:02
i can do the permutation using recursion.but i can't get to compare the 2 strings.that is the problem.can u help me with it?That's why i was asking for the whole code. –  Supratim Jan 27 '10 at 12:20
"must use recursion" and "not homework". One of these assertions is false, IMO. Which one is it @Supratim ? And if both are true, explain yourself!! –  Stephen C Jan 28 '10 at 10:49
-1 for the numerous questions to "post the codez". –  Bart Kiers Jan 29 '10 at 9:33
Just checked how much points you need to be able to vote down: it's 100. So you being able to -1 me for spite is out of the question. But if you were able to do so, I wouldn't care the least. –  Bart Kiers Jan 29 '10 at 9:45

• Sort the two strings's characters.
• Compare the results to see if they're identical.

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:

• If both strings consist of one identical character, return true
• Otherwise:
• remove one character from the first string
• Look through second string for occurrence of this character
• If not present, return false
• Otherwise, remove said character and apply algorithm recursively to the remainders of both strings.
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can't use sort.can u give me code for recursion? –  Supratim Jan 27 '10 at 11:40
can u give me the code for this? –  Supratim Jan 28 '10 at 5:44
what about a hash-map?Can u give me code on that regarding this prob? –  Supratim Jan 28 '10 at 5:47
A hash map would not be helpful. And I will not do your work for you. –  Michael Borgwardt Jan 28 '10 at 7:12
@Supratim: how do you want to pass the class if you only want the code? You're supposed to write it and if you can't then you will (and should!) fail the class. –  Joachim Sauer Jan 28 '10 at 10:27

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

``````public boolean checkAnagram(String str1, String str2) {

if (str1.length() != str2.length())
return false;

char[] a = str1.toCharArray();
char[] b = str2.toCharArray();

Arrays.sort(a);
Arrays.sort(b);

return Arrays.equals(a, b);
}
``````
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There's also Arrays.equals() for the last step. But the idea was not to give readymade code for an obvious homework question. –  Michael Borgwardt Jan 25 '10 at 12:15
@Supratim: what do you think you've been given here? A great suggestion on how to do it and the code. –  Joachim Sauer Jan 27 '10 at 8:04
And someone down-voted me for giving away the full code for a homework question. –  Amarghosh Jan 27 '10 at 8:06
@Amarghosh: I tend to agree that giving full code here is not a good service (didn't downvote, 'though). In this case not even the OP seems to thank you for it. –  Joachim Sauer Jan 27 '10 at 8:22
@Joachim I see your point - I was rep-whoring to hit 8K ASAP I guess ;) –  Amarghosh Jan 27 '10 at 8:34

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.

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Can u please give me the Javacode using hashmaps for this problem? Thanx –  Supratim Jan 27 '10 at 10:24
Supratim: There is a consensus here at SO that we should not do homework for others. Giving you the code would get me downvoted. –  ammoQ Jan 29 '10 at 9:33
i already did it .check the code pasted below. –  Supratim Jan 29 '10 at 9:46
not my problem. –  ammoQ Jan 29 '10 at 10:14
what i meant ammoQ,what do u think about the code? –  Supratim Jan 29 '10 at 10:22
1. Sort the 2 strings by characters and compare if they're the same (O(n log n) time, O(n) space), or
2. Tally the character frequency of the 2 strings and compare if they're the same (O(n) time, O(n) space).
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Actually, the space required is `O(1)` in the second case - 2**16 ints. –  Stephen C Jan 27 '10 at 8:30
That's a bad O(1) ;) And I could use a hash table. –  kennytm Jan 27 '10 at 8:44
In the worst case a hash table is significantly more that 2**16 words. But yes, a hash table would be better in typical cases and also `O(1)` in space / time. BTW - you haven't fixed the error yet ... –  Stephen C Jan 27 '10 at 9:20
For the first, wouldn't it be O(n + log n) time? i.e. just O(n)? –  Chaos Mar 8 at 20:18

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

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can't use sorting.got to use hash maps or recursion.can u help me with that? –  Supratim Jan 28 '10 at 8:58
@Supratim: there are already other answers that make use of a hashmap or recursion. What's wrong with them? –  JRL Jan 28 '10 at 9:30
i need the code.i am new to java.and i will port the code to c++.The java code i need. –  Supratim Jan 28 '10 at 9:37
can u help me with it? –  Supratim Jan 28 '10 at 9:39

First you check the lengths (`n`), if they are not same, they cannot be permutations of each other. Now create two `HashMap<Character, Integer>`. Iterate over each string and put the number of times each character occur in the string. E.g. if the string is aaaaa, the map will have just one element with key a and value 5. Now check if the two maps are identical. This is an `O(n)` algorithm.

EDIT with code snippet :

``````boolean checkPermutation(String str1, String str2) {

char[] chars1 = str1.toCharArray();
char[] chars2 = str2.toCharArray();

Map<Character, Integer> map1 = new HashMap<Character, Integer>();
Map<Character, Integer> map2 = new HashMap<Character, Integer>();

for (char c : chars1) {
int occ = 1;
if (map1.containsKey(c) {
occ = map1.get(c);
occ++;
}
map1.put(c, occ);
}

// now do the same for chars2 and map2

if (map1.size() != map2.size()) {
return false;
}
for (char c : map1.keySet()) {

if (!map2.containsKey(c) || map1.get(c) != map2.get(c)) {
return false;
}
}

return true;
}
``````
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can u give me the javacode for this plz? –  Supratim Jan 27 '10 at 10:12
Is a homework! The idea is that you solve it by yourself, in order to learn. –  JuanZe Jan 27 '10 at 13:41
not homework.can u do it for me –  Supratim Jan 28 '10 at 5:42
nice,but i cannot get the code to work,and where is the user input for the strings? –  Supratim Jan 28 '10 at 10:13
i think there is also some problem with the method declaration. –  Supratim Jan 28 '10 at 10:14

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.

``````public static boolean isPermutation(String s1, String s2){
if (s1.length() != s2.length()) return false;
int checker = 0;
for(int i = 0; i < s1.length();i++ ){
checker ^= s1.charAt(i) ^ s2.charAt(i);
}

return checker == 0;
}
``````
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I did this, and it works well and quickly:

``````public static boolean isPermutation(String str1, String str2)
{
char[] x = str1.toCharArray();
char[] y = str2.toCharArray();
Arrays.sort(x);
Arrays.sort(y);
if(Arrays.equals(x, y))
return true;
return false;
}
``````
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Define "quickly" –  Nima Vaziri Mar 9 '14 at 3:25

I'm working on a Java library that should simplify your task. You can re-implement this algorithm using only two method calls:

``````boolean arePermutationsOfSameString(String s1, String s2) {
s1 = \$(s1).sort().join();
s2 = \$(s2).sort().join();
return s1.equals(s2);
}
``````

testcase

``````@Test
public void stringPermutationCheck() {
// true cases
assertThat(arePermutationsOfSameString("abc", "acb"), is(true));
assertThat(arePermutationsOfSameString("bac", "bca"), is(true));
assertThat(arePermutationsOfSameString("cab", "cba"), is(true));

// false cases
assertThat(arePermutationsOfSameString("cab", "acba"), is(false));
assertThat(arePermutationsOfSameString("cab", "acbb"), is(false));

// corner cases
assertThat(arePermutationsOfSameString("", ""), is(true));
assertThat(arePermutationsOfSameString("", null), is(true));
assertThat(arePermutationsOfSameString(null, ""), is(true));
assertThat(arePermutationsOfSameString(null, null), is(true));
}
``````

PS

In the case you can clone the souces at bitbucket.

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nice,but can u give me complete code of the same problem using hash--map?Thanx anyway. –  Supratim Jan 28 '10 at 5:50
why a hash-map? imho it is the wrong data structure for this problem –  dfa Jan 28 '10 at 9:15
becoz i have to use hash map.otherwise the arrays.sort was the best method. –  Supratim Jan 28 '10 at 9:57
can u give code using hashmaps?Thanx –  Supratim Jan 28 '10 at 10:08
\$(s1).sort() does exactly Arrays.sort() internally –  dfa Jan 28 '10 at 10:09

The obligatory Guava one-liner:

``````boolean isAnagram(String s1, String s2) {
return ImmutableMultiset.copyOf(Chars.asList(s1.toCharArray())).equals(ImmutableMultiset.copyOf(Chars.asList(s2.toCharArray())));
}
``````

(Just for fun. I don't recommend submitting this for your assignment.)

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

1. Figure out what language this is
2. Translate it to Java.

Good luck :-)

``````proc isAnagram(s1, s2);
return {s1, s2} = {''} or
(s2 /= '' and
(exists c = s1(i) |
s2(1) = c and
isAnagram(s1(1..i-1) + s1(i+1..), s2(2..))));
end isAnagram;
``````
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proc-end is also there in eye-OS –  Supratim Jan 28 '10 at 11:20
Poor syntax highlighter got crazy) –  Rorick Jan 28 '10 at 11:28
Not the most efficient method though. –  reinierpost Jan 29 '10 at 9:31
is it TCL,@reinierpost –  Supratim Jan 29 '10 at 9:35
There is also a HP 9000 computers assembler directive like this.However i don't think it is that. –  Supratim Jan 29 '10 at 10:15

I did it using C#

``````bool Arepermutations(string string1, string string2)
{
char[] str1 = string1.ToCharArray();
char[] str2 = string2.ToCharArray();
if (str1.Length !=str2.Length)
return false;
Array.Sort(str1);
Array.Sort(str2);
if (str1.Where((t, i) => t!= str2[i]).Any())
{
return false;
}

return true;

}
``````
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``````public boolean permitation(String s,String t){
if(s.length() != t.length()){
return false;
}

int[] letters = new int[256];//Assumes that the character set is ASCII
char[] s_array = s.toCharArray();

for(char c:s_array){         /////count number of each char in s
letters[c]++;
}
for(int i=0;i<t.length();i++){
int c = (int)t.charAt(i);
if(--letters[c]<0){
return false;
}
}
return true;
}
``````
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``````             import java.io.*;
public class permute
{
public static String sort(String s)
{
char[] str = s.toCharArray();
java.util.Arrays.sort(str);
return new String(str);
}
public static boolean permutation(String s,String t)
{
if(s.length()!=t.length())
{
return false;
}
return sort(s).equals(sort(t));
}
public static void main(String[] args)            throws IOException
{
String string = null;
boolean x=true;
System.out.println("Input String:");
System.out.println("Input another String:");
String resultant = sort(string);
if(x==permutation(result,resultant))
{
System.out.println("String"+" "+"("+result+")"+"is a permutation of String"+" "+"("+string+")");
}
else
{
System.out.println("Sorry No anagram found");
}
}
``````

}

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

``````bool is_permutation(const char *a, const char *b)
{
if (a == NULL || b == NULL)
return false;

if (strlen(a) != strlen(b))
return false;

int sum_a = 0, sum_b = 0;

while (*a != '\0')
sum_a += (int)*a++;

while (*b != '\0')
sum_b += (int)*b++;

return (sum_a == sum_b);
}
``````
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This would fail I guess. As there can be 2 different string summing upto the same number. –  mtk Jun 25 '12 at 10:54
please provide an example of where this will fail. –  lateralpunk Dec 9 '12 at 21:27
"abc" and "bbb" –  Jason Jul 24 '14 at 8:13