# Find all subsets of a list

I have a list and I need to output each subset of the list

for example a b c d e

would output to

`````` a
b
c
d
e
ab
ac
ae

abc
abd
abe
bcd
bce
....
abcde
``````

I believe the correct term is combination no element should be duplicated on the same line

I was going to attempt this with a series of loops but im not even sure wehre to start

any suggestions?

-
duplicated of ?? stackoverflow.com/questions/756055/… –  vaquito Feb 16 '11 at 22:45
`aaaaa` is not a subset of `a b c d e`. What is the actual definition of the result you're looking for? Apparently, elements from your original list can be repeated, but how many times? –  vlad Feb 16 '11 at 22:46
It appears that he wants all sets of sizes 1 to N that can be formed using any number of items from the original set. –  Ron Warholic Feb 16 '11 at 22:48
Agreed with @vlad, if your 2-letter sequences had gone `ae` `ba` `bb` `bc` `...` `ee` it would have been a little more clear that you're going for all sequences of these chars, but you sorta skipped that. –  Daniel DiPaolo Feb 16 '11 at 22:49
Agree with Ron, would probably phrase it as words of maximum length 5 that can be formed from the alphabet { a, b, c, d, e } –  LorenVS Feb 16 '11 at 22:53

This will generate the set you want, but in a different order (I sort by alphabet at the end, you'd want to sort by length as well).

You'll end up with:

a ab abc abcd abcde abce ... d de e

So, every possible subset (aside from the empty string), while maintaining the order of the original list.

The idea is to add each element to to a growing list. With every new element, add it first, and then add it to all existing elements.

Go on to 'b'. Add it to the list. We now have {'a', 'b'}.

Add it to existing elements, so we have 'ab'. Now we have {'a', 'b', 'ab'}.

Then 'c', and add it to existing elements to get 'ac', 'bc', 'abc': {'a', 'b', 'ab', 'c', 'ac', 'bc', abc'}. So forth until we're done.

``````        string set = "abcde";

// Init list
List<string> subsets = new List<string>();

// Loop over individual elements
for (int i = 1; i < set.Length; i++)
{

List<string> newSubsets = new List<string>();

// Loop over existing subsets
for (int j = 0; j < subsets.Count; j++)
{
string newSubset = subsets[j] + set[i];
}

}

// Add in the last element
subsets.Sort();

Console.WriteLine(string.Join(Environment.NewLine, subsets));
``````
-
this looks like its working, I have to modify it slightly but this is a huge help –  Crash893 Feb 17 '11 at 2:03

if all you need are combinations of the elements in your original list, you can transform the problem into the following: you have a bit array of size N, and you want to find all possible choices for the elements of the array. For example, if your original list is

`a b c d e`

`0 1 0 0 0`

which results in an output of

`b`

or the array can be

`1 0 1 1 0`

which returns

`acd`

this is a simple recursion problem that can be solved in an `O(2^n)` time

edit adding pseudo-code for recursion algorithm:

``````CreateResultSet(List<int> currentResult, int step)
{
if (the step number is greater than the length of the original list)
{
add currentResult to list of all results
return
}
else
{
add 0 at the end of currentResult
call CreateResultSet(currentResult, step+1)

add 1 at the end of currentResult
call CreateResultSet(currentResult, step+1)
}
}

for every item in the list of all results
display the result associated to it (i.e. from 1 0 1 1 0 display acd)
``````
-
This is right and i was thinking orginaly of some sort of binary switch to turn on each combo but im not sure how to go about coding it –  Crash893 Feb 17 '11 at 2:01
@Crash893 added pseudo-code for recursion algorithm –  vlad Feb 17 '11 at 15:07

Here is some code I made. It constructs a list of all possible strings from an alphabet, of lengths 1 to maxLength: (in other words, we are calculating the powers of the alphabet)

``````  static class StringBuilder<T>
{
public static List<List<T>> CreateStrings(List<T> alphabet, int maxLength)
{
// This will hold all the strings which we create
List<List<T>> strings = new List<List<T>>();

// This will hold the string which we created the previous time through
// the loop (they will all have length i in the loop)
List<List<T>> lastStrings = new List<List<T>>();
foreach (T t in alphabet)
{
// Populate it with the string of length 1 read directly from alphabet
lastStrings.Add(new List<T>(new T[] { t }));
}

// This holds the string we make by appending each element from the
// alphabet to the strings in lastStrings
List<List<T>> newStrings;

// Here we make string2 for each length 2 to maxLength
for (int i = 0; i < maxLength; ++i)
{
newStrings = new List<List<T>>();
foreach (List<T> s in lastStrings)
{
}
lastStrings = newStrings;
}

return strings;
}

public static List<List<T>> AppendElements(List<T> list, List<T> alphabet)
{
// Here we just append an each element in the alphabet to the given list,
// creating a list of new string which are one element longer.
List<List<T>> newList = new List<List<T>>();
List<T> temp = new List<T>(list);
foreach (T t in alphabet)
{
// Append the element

// Add our new string to the collection

// Remove the element so we can make another string using
// the next element of the alphabet
temp.RemoveAt(temp.Count-1);
}
return newList;
}
}
``````
-
I had similar code in my original answer, but it turns out the asker wasn't clear originally and this is not the solution he needs. –  Sapph Feb 16 '11 at 23:39

something on the lines of an extended while loop :

``````<?

\$testarray[0] = "a";
\$testarray[1] = "b";
\$testarray[2] = "c";
\$testarray[3] = "d";
\$testarray[4] = "e";

\$x=0;
\$y = 0;
while(\$x<=4) {

\$subsetOne[\$x] .= \$testarray[\$y];
\$subsetOne[\$x] .= \$testarray[\$x];

\$subsetTwo[\$x] .= \$testarray[\$y];
\$subsetTwo[\$x] .= \$subsetOne[\$x];

\$subsetThree[\$x] = str_replace("aa","ab",\$subsetTwo[\$x]);

\$x++;
}

?>
``````
-
Put your code in a code section please, thanks. –  Philippe Lavoie Feb 16 '11 at 23:35

This will work with any collection. I modified @Sapp's answer a little

``````    static List<List<T>> GetSubsets<T>(IEnumerable<T> Set)
{
var set = Set.ToList<T>();

// Init list
List<List<T>> subsets = new List<List<T>>();

// Loop over individual elements
for (int i = 1; i < set.Count; i++)
{

List<List<T>> newSubsets = new List<List<T>>();

// Loop over existing subsets
for (int j = 0; j < subsets.Count; j++)
{
var newSubset = new List<T>();
foreach(var temp in subsets[j])

}