Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

Let's say we have a Set S which contains a few subsets:

- [a,b,c]
- [a,b]
- [c]
- [d,e,f]
- [d,f]
- [e]

Let's also say that S contains six unique elements: a, b, c, d, e and f.

How can we find all possible subsets of S that contain each of the unique elements of S exactly once?

The result of the function/method should be something like that:

  1. [[a,b,c], [d,e,f]];
  2. [[a,b,c], [d,f], [e]];
  3. [[a,b], [c], [d,e,f]];
  4. [[a,b], [c], [d,f], [e]].

Is there any best practice or any standard way to achieve that?

I would be grateful for a Pseudo-code, Ruby or Erlang example.

share|improve this question
up vote 3 down vote accepted

It sounds like what you are looking for are the partitions of a set/array.

One way of doing this is recursively:

  • a 1 element array [x] has exactly one partition
  • if x is an array of the form x = [head] + tail, then the partitions of x are generated by taking each partition of tail and adding head to each possible. For example if we were generating the partitions of [3,2,1] then from the partition [[2,1]] of [2,1] we can either add 3 to to [2,1] or as a separate element, which gives us 2 partitions [[3,2,1] or [[2,1], [3]] of the 5 that [1,2,3] has

A ruby implementation looks a little like

def partitions(x)
  if x.length == 1
    head, tail = x[0], x[1, x.length-1]
    partitions(tail).inject([]) do |result, tail_partition|
      result + partitions_by_adding_element(tail_partition, head)

def partitions_by_adding_element(partition, element)
  (0..partition.length).collect do |index_to_add_at|
    new_partition = partition.dup
    new_partition[index_to_add_at] = (new_partition[index_to_add_at] || []) + [element]
share|improve this answer
Works great! But I found it hangs for anything equal or above 10 items. Any idea why? running partitions([1,2,3,4,5,6,7,8,9,10]) hangs ruby – mbdev Mar 15 '12 at 21:39
The collections involved get big quite quickly - there are 115975 partitions of a 10 item array, still it only took a few seconds on my machine. If you are running this in irb, then it will try and display the result - not a good idea! – Frederick Cheung Mar 15 '12 at 22:02
it actually hangs in rails s and while running under rspec from RubyMine. I am on Mac running Lion. My problem is actually more specialized than this, so I posted it here:… – mbdev Mar 16 '12 at 6:34

Why not to use the greedy algorithm?

1) sort set S descending using the subsets length
2) let i := 0
3) add S[i] to solution
4) find S[j] where j > i such as it contains of elements which are not in current solution
5) if you can't find element described in 4 then
5.a) clear solution
5.b) increase i
5.c) if i > |S| then break, no solution found ;( 5.d) goto 3

Hmm, read again your post and come to conclusion that you need a Best-First search. Your question is not actually a partition problem because what you need is also known as Change-making problem but in the latter situation the very first solution is taken as the best one - you actually want to find all solutions and that's the reason why you should you the best-first search strategy approach.

share|improve this answer

It seems like a classic "backtrack" excercise.

  • #1: Order your sets amongst eacother, so the backtrack will not give solutions twice.
  • #2: current_set = [], set_list=[]
  • #3: Loop Run through all the set that have lower order mark than the last in the set_list, (or all if the set_list is empty). Let call it set_at_hand
  • #4: If set_at_hand has no intersection with current_set
  • #4/true/1: Union it to current_set, also add to set_list.
  • #4/true/2: current_set complete? true: add set_list to the list of correct solutions. false: recurse to #3
  • #4/true/3: remove set_at_hand from current_set and set_list
  • #5: End of loop
  • #6: return
share|improve this answer

generate all subsets

def allSubsets set
    for i in (0..combs) do
        0.upto(set.length-1){|j| subset<<set[j] if i&(1<<j)!=0}
share|improve this answer

take a look here:
this is a simple algorithm i built to find a powerset of an array.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.