How to find permutation of k in a given length?

How can I find the permutations of k in a given length?

For example:

The word `cat` has 3 letters: How can I find all the permutations of 2 in the word `cat`. Result should be: `ac`, `at`, `ca`, `ac`, etc...

This is not a homework problem. Any language could be used but more preferable: C/C++ or C#. I know how to create the recursion for size LENGTH but not for a custom size.

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Any particular language? – Ignacio Vazquez-Abrams Feb 28 '10 at 5:38
Sounds like a homework problem. – Sergey Feb 28 '10 at 5:39
Nope... Not homework problem and any language could be used but more preferable: C/C++ or C#. – Y_Y Feb 28 '10 at 5:40
I know how to create the recursion for size LENGHT but not for a custom size. – Y_Y Feb 28 '10 at 5:41
@KennyTM: No. That is not what I meant. Since he seems to want english words, banana is valid input and so you should not duplicate aa in the output now (which the standard algorithm will). – Aryabhatta Feb 28 '10 at 14:49

Here is one in C#, which should work even with repeated characters. For example on "banana" for permutations of length 2 it gives:

ba bn ab aa an nb na nn

The basic idea is to fix the first character, then form all permutations of length k-1, then prepend the character to those k-1 length permutations. To deal with duplicate characters, we keep track of the count left (i.e the ones which can be used for sub-permutations).

Not exemplary code, but should give you the idea. (If you find bugs, let me know and I can edit).

``````static List<string> Permutations(Dictionary<char, int> input, int length) {
List<string> permutations = new List<string>();

List<char> chars = new List<char>(input.Keys);

// Base case.
if (length == 0) {
return permutations;
}

foreach (char c in chars) {

// There are instances of this character left to use.
if (input[c] > 0) {

// Use one instance up.
input[c]--;

// Find sub-permutations of length length -1.
List<string> subpermutations = Permutations(input, length - 1);

// Give back the instance.
input[c]++;

foreach (string s in subpermutations) {

// Prepend the character to be the first character.

}
}
}

return permutations;
}
``````

And here is the full program I have, to use it:

``````using System;
using System.Collections.Generic;

namespace StackOverflow {

class Program {
static void Main(string[] args) {
foreach (string s in p) {
Console.WriteLine(s);
}
}

static List<string> Permutations(string s, int length) {
Dictionary<char, int> input = new Dictionary<char, int>();
foreach (char c in s) {
if (input.ContainsKey(c)) {
input[c]++;
} else {
input[c] = 1;
}
}
return Permutations(input, length);
}

static List<string> Permutations(Dictionary<char, int> input,
int length) {
List<string> permutations = new List<string>();

List<char> chars = new List<char>(input.Keys);
if (length == 0) {
return permutations;
}

foreach (char c in chars) {
if (input[c] > 0) {
input[c]--;
List<string> subpermutations = Permutations(input,
length - 1);
input[c]++;

foreach (string s in subpermutations) {
}
}
}

return permutations;
}
}
}
``````
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Thanks for this code. – Y_Y Mar 1 '10 at 2:09
I studied it and it's pretty cool. – Y_Y Mar 1 '10 at 2:10
@Y_Y: Glad it helped! It was fun to revisit this one after a long time. – Aryabhatta Mar 1 '10 at 8:05

since its not homework, i can assume you don't mind using some libraries others created? If your search the web, you can find many. one of which is this. give it a try.

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Link works for me. – StilesCrisis Jan 23 '12 at 7:58

What's wrong with the recursive solution and passing an extra parameter (depth) so that the recursive function returns immediately for depth > n.

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How would I approach this? – Y_Y Feb 28 '10 at 6:23

Not the most efficient, but it works:

``````public class permutation
{
public static List<string> getPermutations(int n, string word)
{
List<string> tmpPermutation = new List<string>();
if (string.IsNullOrEmpty(word) || n <= 0)
{
}
else
{
for (int i = 0; i < word.Length; i++)
{
string tmpWord = word.Remove(i, 1);
foreach (var item in getPermutations(n - 1, tmpWord))
{
}
}
}
return tmpPermutation;
}
}
``````
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``````void Prem (char *str, int k, int length) {
if (k == length-1){
printf("%s\n",str);
return;
} else {
for (int i = k ; i < length; ++i) {
char t = str[k];
str[k] = str[i];
str[i] = t;
Prem(str,k+1,length);
t = str[k];
str[k] = str[i];
str[i] = t;
}
}
}
``````
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If I'm not mistaken, this problem can be solved by combinadics too, as on http://en.wikipedia.org/wiki/Combinadic/, there are reference implementations there too.

I have used the Java solution (http://docs.google.com/Doc?id=ddd8c4hm_5fkdr3b/) myself for generating all possible triples from a sequence of numbers, this should be no different.

I lack the wherewithal to explain the math behind it, but as I understand this is the least complex way to iterate over all possible nCr (i.e. 3C2 for your cat example) choices within a collection.

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While this link may answer the question, it is better to include the essential parts of the answer here and provide the link for reference. Link-only answers can become invalid if the linked page changes. – skobaljic Jun 7 '15 at 22:49

First find the possible subsets of your array. You can do this in a recursive way it was discussed in Iterating over subsets of any size

Second calculate the permutations of every subset with the STL-Algorithm next_permutation

I haven't implemented it but i think it should work.

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