# Partition a Set into k Disjoint Subset

Give a Set `S`, partition the set into `k` disjoint subsets such that the difference of their sums is minimal.

say, `S = {1,2,3,4,5}` and `k = 2`, so `{ {3,4}, {1,2,5} }` since their sums `{7,8}` have minimal difference. For `S = {1,2,3}, k = 2` it will be `{{1,2},{3}}` since difference in sum is `0`.

The problem is similar to The Partition Problem from The Algorithm Design Manual. Except Steven Skiena discusses a method to solve it without rearrangement.

I was going to try Simulated Annealing. So i wondering, if there was a better method?

-
This problem is dope. I'll definitely think about it = ) – Phonon Mar 28 '11 at 13:01
What do you mean by 'without rearrangement'? – dfb Mar 28 '11 at 20:22
@spinning_plate, In the skiena version, the order of the elements mattered, you couldn't shuffle them up....so it wasn't a "set" persay. – st0le Mar 29 '11 at 4:42
How do you define the "difference of their sums" when k > 2? – mbeckish Mar 29 '11 at 17:40
@mbeckish, I'd say something like max( sum(A)-sum(B) ) for all A,B – dfb Mar 29 '11 at 17:45

The pseudo-polytime algorithm for a knapsack can be used for `k=2`. The best we can do is sum(S)/2. Run the knapsack algorithm

``````for s in S:
for i in 0 to sum(S):
if arr[i] then arr[i+s] = true;
``````

then look at sum(S)/2, followed by sum(S)/2 +/- 1, etc.

For 'k>=3' I believe this is NP-complete, like the 3-partition problem.

The simplest way to do it for k>=3 is just to brute force it, here's one way, not sure if it's the fastest or cleanest.

``````import copy
arr = [1,2,3,4]

def t(k,accum,index):
print accum,k
if index == len(arr):
if(k==0):
return copy.deepcopy(accum);
else:
return [];

element = arr[index];
result = []

for set_i in range(len(accum)):
if k>0:
clone_new = copy.deepcopy(accum);
clone_new[set_i].append([element]);
result.extend( t(k-1,clone_new,index+1) );

for elem_i in range(len(accum[set_i])):
clone_new = copy.deepcopy(accum);
clone_new[set_i][elem_i].append(element)
result.extend( t(k,clone_new,index+1) );

return result

print t(3,[[]],0);
``````

Simulated annealing might be good, but since the 'neighbors' of a particular solution aren't really clear, a genetic algorithm might be better suited to this. You'd start out by randomly picking a group of subsets and 'mutate' by moving numbers between subsets.

-
I've solved it the same way for `k=2`, need for `k>=3` – st0le Mar 29 '11 at 4:43
see edits for an idea – dfb Mar 29 '11 at 17:31

If the sets are large, I would definitely go for stochastic search. Don't know exactly what spinning_plate means when writing that "the neighborhood is not clearly defined". Of course it is --- you either move one item from one set to another, or swap items from two different sets, and this is a simple neighborhood. I would use both operations in stochastic search (which in practice could be tabu search or simulated annealing.)

-