# Listing all permutations of a string/integer

A common task in programming interviews (not from my experience of interviews though) is to take a string or an integer and list every possible permutation.

Is there an example of how this is done and the logic behind solving such a problem?

I've seen a few code snippets but they weren't well commented/explained and thus hard to follow.

-
Here is a question to Permutations with some good explaining answers, including a graph, but not in C#. –  user unknown May 9 '12 at 19:20

First of all: it smells like recursion of course!

Since you also wanted to know the principle, I did my best to explain it human language. I think recursion is very easy most of the times. You only have to grasp two steps:

1. The first step
2. All the other steps (all with the same logic)

In human language:

In short:
1. The permutation of 1 element is one element.
2. The permutation of a set of elements is a list each of the elements, concatenated with every permutation of the other elements.

Example:

If the set just has one element -->
return it.
perm(a) -> a

If the set has two characters: for each element in it: return the element, with the permutation of the rest of the elements added, like so:

perm(ab) ->

a + perm(b) -> ab

b + perm(a) -> ba

Further: for each character in the set: return a character, concatenated with a perumation of > the rest of the set

perm(abc) ->

a + perm(bc) --> abc, acb

b + perm(ac) --> bac, bca

c + perm(ab) --> cab, cba

perm(abc...z) -->

a + perm(...), b + perm(....)
....

I found the pseudocode on http://www.programmersheaven.com/mb/Algorithms/369713/369713/permutation-algorithm-help/:

``````makePermutations(permutation) {
if (length permutation < required length) {
for (i = min digit to max digit) {
if (i not in permutation) {
makePermutations(permutation+i)
}
}
}
else {
}
}
``````

C#

OK, and something more elaborate (and since it is tagged c #), from http://radio.weblogs.com/0111551/stories/2002/10/14/permutations.html : Rather lengthy, but I decided to copy it anyway, so the post is not dependent on the original.

The function takes a string of characters, and writes down every possible permutation of that exact string, so for example, if "ABC" has been supplied, should spill out:

ABC, ACB, BAC, BCA, CAB, CBA.

Code:

``````class Program
{
private static void Swap(ref char a, ref char b)
{
if (a == b) return;

a ^= b;
b ^= a;
a ^= b;
}

public static void GetPer(char[] list)
{
int x = list.Length - 1;
GetPer(list, 0, x);
}

private static void GetPer(char[] list, int k, int m)
{
if (k == m)
{
Console.Write(list);
}
else
for (int i = k; i <= m; i++)
{
Swap(ref list[k], ref list[i]);
GetPer(list, k + 1, m);
Swap(ref list[k], ref list[i]);
}
}

static void Main()
{
string str = "sagiv";
char[] arr = str.ToCharArray();
GetPer(arr);
}
}
``````
-
For a bit more clarity, I would call k "recursionDepth" and call m "maxDepth". –  Nerf Herder Aug 26 '14 at 21:31

It's just two lines of code if LINQ is allowed to use. Please see my answer here.

EDIT

Here is my generic function which can return all the permutations (not combinations) from a list of T:

``````static IEnumerable<IEnumerable<T>>
GetPermutations<T>(IEnumerable<T> list, int length)
{
if (length == 1) return list.Select(t => new T[] { t });

return GetPermutations(list, length - 1)
.SelectMany(t => list.Where(e => !t.Contains(e)),
(t1, t2) => t1.Concat(new T[] { t2 }));
}
``````

Example:

``````IEnumerable<IEnumerable<int>> result =
GetPermutations(Enumerable.Range(1, 3), 3);
``````

Output - a list of integer-lists:

``````{1,2,3} {1,3,2} {2,1,3} {2,3,1} {3,1,2} {3,2,1}
``````

As this function uses LINQ so it requires .net 3.5 or higher.

-
combinations and permutations are different things. it's similar, but your answer there seems to be answering a different problem than all the permutations of a set of elements. –  Shawn Kovac Mar 4 '14 at 18:58
@ShawnKovac, thanks for pointing this out! I've updated my code from combination to permutation. –  Pengyang Mar 12 '14 at 7:24
``````void permute (char *str, int ptr) {
int i, len;
len = strlen(str);
if (ptr == len) {
printf ("%s\n", str);
return;
}

for (i = ptr ; i < len ; i++) {
swap (&str[ptr], &str[i]);
permute (str, ptr + 1);
swap (&str[ptr], &str[i]);
}
}
``````

You can write your swap function to swap characters.
This is to be called as permute(string, 0);

-

First of all, sets have permutations, not strings or integers, so I'll just assume you mean "the set of characters in a string."

Note that a set of size n has n! n-permutations.

The following pseudocode (from Wikipedia), called with k = 1...n! will give all the permutations:

``````function permutation(k, s) {
for j = 2 to length(s) {
swap s[(k mod j) + 1] with s[j]; // note that our array is indexed starting at 1
k := k / j; // integer division cuts off the remainder
}
return s;
}
``````

Here's the equivalent Python code (for 0-based array indexes):

``````def permutation(k, s):
r = s[:]
for j in range(2, len(s)+1):
r[j-1], r[k%j] = r[k%j], r[j-1]
k = k/j+1
return r
``````
-
what language is this? the question is marked C#. i don't know what `k := k / j;` does. –  Shawn Kovac Mar 4 '14 at 18:56

Here I have found the solution. It was written in Java, but I have converted it to C#. I hope it will help you.

Here's the code in C#:

``````static void Main(string[] args)
{
string str = "ABC";
char[] charArry = str.ToCharArray();
permute(charArry, 0, 2);
}

static void permute(char[] arry, int i, int n)
{
int j;
if (i==n)
Console.WriteLine(arry);
else
{
for(j = i; j <=n; j++)
{
swap(ref arry[i],ref arry[j]);
permute(arry,i+1,n);
swap(ref arry[i], ref arry[j]); //backtrack
}
}
}

static void swap(ref char a, ref char b)
{
char tmp;
tmp = a;
a=b;
b = tmp;
}
``````
-

Here's a good article covering three algorithms for finding all permutations, including one to find the next permutation.

http://www.cut-the-knot.org/do_you_know/AllPerm.shtml

C++ and Python have built-in next_permutation and itertools.permutations functions respectively.

-

Here's a purely functional F# implementation:

``````
let factorial i =
let rec fact n x =
match n with
| 0 -> 1
| 1 -> x
| _ -> fact (n-1) (x*n)
fact i 1

let swap (arr:'a array) i j = [| for k in 0..(arr.Length-1) -> if k = i then arr.[j] elif k = j then arr.[i] else arr.[k] |]

let rec permutation (k:int,j:int) (r:'a array) =
if j = (r.Length + 1) then r
else permutation (k/j+1, j+1) (swap r (j-1) (k%j))

let permutations (source:'a array) = seq { for k = 0 to (source |> Array.length |> factorial) - 1 do yield permutation (k,2) source }
``````

Performance can be greatly improved by changing swap to take advantage of the mutable nature of CLR arrays, but this implementation is thread safe with regards to the source array and that may be desirable in some contexts. Also, for arrays with more than 16 elements int must be replaced with types with greater/arbitrary precision as factorial 17 results in an int32 overflow.

-

Slightly modified version in C# that yields needed permutations in an array of ANY type.

``````    // USAGE: create an array of any type, and call Permutations()
var vals = new[] {"a", "bb", "ccc"};
foreach (var v in Permutations(vals))
Console.WriteLine(string.Join(",", v)); // Print values separated by comma

public static IEnumerable<T[]> Permutations<T>(T[] values, int fromInd = 0)
{
if (fromInd + 1 == values.Length)
yield return values;
else
{
foreach (var v in Permutations(values, fromInd + 1))
yield return v;

for (var i = fromInd + 1; i < values.Length; i++)
{
SwapValues(values, fromInd, i);
foreach (var v in Permutations(values, fromInd + 1))
yield return v;
SwapValues(values, fromInd, i);
}
}
}

private static void SwapValues<T>(T[] values, int pos1, int pos2)
{
if (pos1 != pos2)
{
T tmp = values[pos1];
values[pos1] = values[pos2];
values[pos2] = tmp;
}
}
``````
-

I liked FBryant87 approach since it's simple. Unfortunately, it does like many other "solutions" not offer all permutations or of e.g. an integer if it contains the same digit more than once. Take 656123 as an example. The line:

``````var tail = chars.Except(new List<char>(){c});
``````

using Except will cause all occurrences to be removed, i.e. when c = 6, two digits are removed and we are left with e.g. 5123. Since none of the solutions I tried solved this, I decided to try and solve it myself by FBryant87's code as base. This is what I came up with:

``````private static List<string> FindPermutations(string set)
{
var output = new List<string>();
if (set.Length == 1)
{
}
else
{
foreach (var c in set)
{
// Remove one occurrence of the char (not all)
var tail = set.Remove(set.IndexOf(c), 1);
foreach (var tailPerms in FindPermutations(tail))
{
}
}
}
return output;
}
``````

I simply just remove the first found occurrence using .Remove and .IndexOf. Seems to work as intended for my usage at least. I'm sure it could be made cleverer.

One thing to note though: The resulting list may contain duplicates, so make sure you either make the method return e.g. a HashSet instead or remove the duplicates after the return using any method you like.

-

``````var values1 = new[] { 1, 2, 3, 4, 5 };

foreach (var permutation in values1.GetPermutations())
{
Console.WriteLine(string.Join(", ", permutation));
}

var values2 = new[] { 'a', 'b', 'c', 'd', 'e' };

foreach (var permutation in values2.GetPermutations())
{
Console.WriteLine(string.Join(", ", permutation));
}

``````

I have been used this algorithm for years, it has O(N) time and space complexity to calculate each permutation.

``````public static class SomeExtensions
{
public static IEnumerable<IEnumerable<T>> GetPermutations<T>(this IEnumerable<T> enumerable)
{
var array = enumerable as T[] ?? enumerable.ToArray();

var factorials = Enumerable.Range(0, array.Length + 1)
.Select(Factorial)
.ToArray();

for (var i = 0L; i < factorials[array.Length]; i++)
{
var sequence = GenerateSequence(i, array.Length - 1, factorials);

yield return GeneratePermutation(array, sequence);
}
}

private static IEnumerable<T> GeneratePermutation<T>(T[] array, IReadOnlyList<int> sequence)
{
var clone = (T[]) array.Clone();

for (int i = 0; i < clone.Length - 1; i++)
{
Swap(ref clone[i], ref clone[i + sequence[i]]);
}

return clone;
}

private static int[] GenerateSequence(long number, int size, IReadOnlyList<long> factorials)
{
var sequence = new int[size];

for (var j = 0; j < sequence.Length; j++)
{
var facto = factorials[sequence.Length - j];

sequence[j] = (int)(number / facto);
number = (int)(number % facto);
}

return sequence;
}

static void Swap<T>(ref T a, ref T b)
{
T temp = a;
a = b;
b = temp;
}

private static long Factorial(int n)
{
long result = n;

for (int i = 1; i < n; i++)
{
result = result * i;
}

return result;
}
}
``````
-
Can I use words like MA, AGE, AgenteSL ? –  Kiquenet Sep 18 at 10:03
If you mean `"AgenteSL".GetPermutations()` or any string yes. –  Najera Sep 18 at 16:56
Upvote for the excellent solution! PD: It's so damn fast :D –  mishamosher Sep 29 at 0:44

Here is the function which will print all permutaion. This function implements logic Explained by peter.

``````public class Permutation
{
//http://www.java2s.com/Tutorial/Java/0100__Class-Definition/RecursivemethodtofindallpermutationsofaString.htm

public static void permuteString(String beginningString, String endingString)
{

if (endingString.Length <= 1)
Console.WriteLine(beginningString + endingString);
else
for (int i = 0; i < endingString.Length; i++)
{

String newString = endingString.Substring(0, i) + endingString.Substring(i + 1);

permuteString(beginningString + endingString.ElementAt(i), newString);

}
}
}

static void Main(string[] args)
{

Permutation.permuteString(String.Empty, "abc");

}
``````
-

The below is my implementation of permutation . Don't mind the variable names, as i was doing it for fun :)

``````class combinations
{
static void Main()
{

string choice = "y";
do
{
try
{
Console.WriteLine("Enter word :");
Console.WriteLine("Combinatins for word :");
List<string> final = comb(abc);
int count = 1;
foreach (string s in final)
{
Console.WriteLine("{0} --> {1}", count++, s);
}
Console.WriteLine("Do you wish to continue(y/n)?");
}
catch (Exception exc)
{
Console.WriteLine(exc);
}
} while (choice == "y" || choice == "Y");
}

static string swap(string test)
{
return swap(0, 1, test);
}

static List<string> comb(string test)
{
List<string> sec = new List<string>();
List<string> first = new List<string>();
else if (test.Length > 2)
{
sec = generateWords(test);
foreach (string s in sec)
{
string init = s.Substring(0, 1);
string restOfbody = s.Substring(1, s.Length - 1);

List<string> third = comb(restOfbody);
foreach (string s1 in third)
{
if (!first.Contains(init + s1)) first.Add(init + s1);
}

}
}

return first;
}

static string ShiftBack(string abc)
{
char[] arr = abc.ToCharArray();
char temp = arr[0];
string wrd = string.Empty;
for (int i = 1; i < arr.Length; i++)
{
wrd += arr[i];
}

wrd += temp;
return wrd;
}

static List<string> generateWords(string test)
{
List<string> final = new List<string>();
if (test.Length == 1)
else
{
string holdString = test;
while (final.Count < test.Length)
{
holdString = ShiftBack(holdString);
}
}

return final;
}

static string swap(int currentPosition, int targetPosition, string temp)
{
char[] arr = temp.ToCharArray();
char t = arr[currentPosition];
arr[currentPosition] = arr[targetPosition];
arr[targetPosition] = t;
string word = string.Empty;
for (int i = 0; i < arr.Length; i++)
{
word += arr[i];

}

return word;

}
}
``````
-

Here's a high level example I wrote which illustrates the human language explanation Peter gave:

``````    public List<string> FindPermutations(string input)
{
if (input.Length == 1)
return new List<string> { input };
var perms = new List<string>();
foreach (var c in input)
{
var others = input.Remove(input.IndexOf(c), 1);
}
return perms;
}
``````
-
This solution is actually flawed in that if the string set contains any repeat characters, it will fail. For example, on the word 'test', the Except command will remove both instances of 't' instead of just the first and last when necessary. –  Middas Jun 27 at 17:52
@Middas well spotted, fortunately hug has come up with a solution to address this. –  FBryant87 Jul 7 at 12:38

Here is the function which will print all permutations recursively.

``````public void Permutations(string input, StringBuilder sb)
{
if (sb.Length == input.Length)
{
Console.WriteLine(sb.ToString());
return;
}

char[] inChar = input.ToCharArray();

for (int i = 0; i < input.Length; i++)
{
if (!sb.ToString().Contains(inChar[i]))
{
sb.Append(inChar[i]);
Permutations(input, sb);
RemoveChar(sb, inChar[i]);
}
}
}

private bool RemoveChar(StringBuilder input, char toRemove)
{
int index = input.ToString().IndexOf(toRemove);
if (index >= 0)
{
input.Remove(index, 1);
return true;
}
return false;
}
``````
-

Here is a C# answer which is a little simplified.

``````public static void StringPermutationsDemo()
{
strBldr = new StringBuilder();

string result = Permute("ABCD".ToCharArray(), 0);
MessageBox.Show(result);
}

static string Permute(char[] elementsList, int startIndex)
{
if (startIndex == elementsList.Length)
{
foreach (char element in elementsList)
{
strBldr.Append(" " + element);
}
strBldr.AppendLine("");
}
else
{
for (int tempIndex = startIndex; tempIndex <= elementsList.Length - 1; tempIndex++)
{
Swap(ref elementsList[startIndex], ref elementsList[tempIndex]);

Permute(elementsList, (startIndex + 1));

Swap(ref elementsList[startIndex], ref elementsList[tempIndex]);
}
}

return strBldr.ToString();
}

static void Swap(ref char Char1, ref char Char2)
{
char tempElement = Char1;
Char1 = Char2;
Char2 = tempElement;
}
``````

Output:

``````1 2 3
1 3 2

2 1 3
2 3 1

3 2 1
3 1 2
``````
-

This is my solution which it is easy for me to understand

``````class ClassicPermutationProblem
{
ClassicPermutationProblem() { }

private static void PopulatePosition<T>(List<List<T>> finalList, List<T> list, List<T> temp, int position)
{
foreach (T element in list)
{
List<T> currentTemp = temp.ToList();
if (!currentTemp.Contains(element))
else
continue;

if (position == list.Count)
else
PopulatePosition(finalList, list, currentTemp, position + 1);
}
}

public static List<List<int>> GetPermutations(List<int> list)
{
List<List<int>> results = new List<List<int>>();
PopulatePosition(results, list, new List<int>(), 1);
return results;
}
}

static void Main(string[] args)
{
List<List<int>> results = ClassicPermutationProblem.GetPermutations(new List<int>() { 1, 2, 3 });
}
``````
-
``````class Permutation
{
public static List<string> Permutate(string seed, List<string> lstsList)
{
loopCounter = 0;
// string s="\w{0,2}";
var lstStrs = PermuateRecursive(seed);

Trace.WriteLine("Loop counter :" + loopCounter);
return lstStrs;
}

// Recursive function to find permutation
private static List<string> PermuateRecursive(string seed)
{
List<string> lstStrs = new List<string>();

if (seed.Length > 2)
{
for (int i = 0; i < seed.Length; i++)
{
str = Swap(seed, 0, i);

PermuateRecursive(str.Substring(1, str.Length - 1)).ForEach(
s =>
{
loopCounter++;
});
;
}
}
else
{
}
return lstStrs;
}
//Loop counter variable to count total number of loop execution in various functions
private static int loopCounter = 0;

//Non recursive  version of permuation function
public static List<string> Permutate(string seed)
{
loopCounter = 0;
List<string> strList = new List<string>();
for (int i = 0; i < seed.Length; i++)
{
int count = strList.Count;
for (int j = i + 1; j < seed.Length; j++)
{
for (int k = 0; k < count; k++)
{
loopCounter++;
}
}
}
Trace.WriteLine("Loop counter :" + loopCounter);
return strList;
}

private static string Swap(string seed, int p, int p2)
{
Char[] chars = seed.ToCharArray();
char temp = chars[p2];
chars[p2] = chars[p];
chars[p] = temp;
return new string(chars);
}
}
``````
-
``````    /// <summary>
/// Print All the Permutations.
/// </summary>
/// <param name="inputStr">input string</param>
/// <param name="strLength">length of the string</param>
/// <param name="outputStr">output string</param>
private void PrintAllPermutations(string inputStr, int strLength,string outputStr, int NumberOfChars)
{
//Means you have completed a permutation.
if (outputStr.Length == NumberOfChars)
{
Console.WriteLine(outputStr);
return;
}

//For loop is used to print permutations starting with every character. first print all the permutations starting with a,then b, etc.
for(int i=0 ; i< strLength; i++)
{
// Recursive call : for a string abc = a + perm(bc). b+ perm(ac) etc.
PrintAllPermutations(inputStr.Remove(i, 1), strLength - 1, outputStr + inputStr.Substring(i, 1), 4);
}
}
``````
-