Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am working on a set partitioning problem and need a way to define all combinations of unordered bucket sizes. Given N elements and exactly M groups, find every combination of group sizes such that the sum of the group sizes is N. Note: The size of the bucket cannot be 0.

For example, assume 6 items need to be placed in 3 buckets. The solution I'm looking for is:


To map these equally, I use a map function as follows:

@grouping = map { int( ($items + $_) / $groups ) } 0 .. $groups-1;

To get all combinations I'm thinking some kind of recursive function where each level of recursion N finds the possible values for element N in the array. The eligible values each level can insert is >= previousLevel. This is sort of what I'm thinking but there has got to be a better way to do this....

sub getList($$@){
    my $itemCount = shift;
    my $groupCount = shift;
    my @currentArray = @_;
    my $positionToFill= @currentArray;
    if($positionToFill == 0){
        my $minValue = 1;
        my $minValue = currentArray[$positionToFill-1];
    my $currentSum = sum(@currentArray);
    return undef if $currentSum + $minValue >= $items;

    my @possibleCombinations = ();
    for(my $i = $minValue; $i < $items - $currentSum; $i++){
        $currentArray[$positionToFill] = $i;
        if($positionToFill == $groupCount-1){
            push(@possibleCombinations, \@currentArray)
            push(@possibleCombinations, getList($itemCount, $groupCount, @currentArray);
    return @currentArray;
share|improve this question
you need to tell us what you have so far, and what your specific problem(s) is/are. –  Mat Mar 22 '11 at 19:03
Create all combinations, and then filter out that don't meet the sum criteria. –  Ether Mar 22 '11 at 19:05
@Ether: that works for 6 but doesn't scale so well –  ysth Mar 22 '11 at 19:10
@ysth: sure, but the OP didn't say that performance was a priority, or mention how big the buckets might get. It's not at all clear that the homework assignment requires a more optimized solution. Also, an unefficient solution is usually better than none, and writing it can cause the insight into how to improve it. –  Ether Mar 22 '11 at 19:32

1 Answer 1

up vote 1 down vote accepted

To group N items into M groups, ultimately you need a recursive function that groups N-1 (or fewer) items into M-1 groups.

sub partition {
    # @results is a list of array references, the part of the partitions
    # created in previous iterations
    my ($N, $M, @results) = @_;

    if ($M == 1) {
        # only one group. All elements must go in this group.
        return map [ sort {$a <=> $b} @$_, $N ], @results;

    # otherwise, put from 1 to $N/$M items in the next group,
    # and invoke this function recursively
    my @new_results = ();
    for (my $n = 1; $n <= $N/$M; $n++) {
        push @new_results, partition($N-$n, $M-1,
                                map [ @$_, $n ] @results);
    return @new_results;

and start the process with a call like

@all_partitions = partition(6, 3, []);    #  [] = list with one ref to an empty array

This method will produce a few duplicates that you'll have to filter out, but overall it will be pretty efficient.

share|improve this answer
No duplicates if you also pass a maximum value. –  ysth Mar 23 '11 at 1:02

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.