# How to group N items?

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:

``````([1,2,3],[1,1,4],[2,2,2])
``````

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;
}
else{
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)
}
else{
push(@possibleCombinations, getList(\$itemCount, \$groupCount, @currentArray);
}
}
return @currentArray;
}
``````
-
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

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.

-
No duplicates if you also pass a maximum value. –  ysth Mar 23 '11 at 1:02