I'm looking for an efficient way to generate many M-sized subsets from a set S, of size N.

Ideally I would like to generate all of these, but because I'm using them for other computations, this becomes infeasible.

Instead, I would like to generate K disparate subsets of S, such that the K chosen subsets minimize the sum of the size of the all pairwise intersections between the K subsets.

In other words If I have K subsets And I take the pairwise intersection of all of those subsets. And then I sum the size of all of those sets together. I get as low of a number as I can.

Basically, I want these subsets to be as "far away" from each other was possible. I've been trying to think of how I would go about doing this, but I'm drawing a blank.

To simulate it in the meantime I've written this function

```
def subset_split(full_set, M, K):
np.random.seed(0) # repeatibility
seen = set([])
subset_list = []
for kx in xrange(K):
np.random.shuffle(full_set)
failsafe = 0
while True:
np.random.shuffle(full_set)
subset = tuple(full_set[0:M])
if not subset in seen:
seen.add(subset)
subset_list.append(subset)
break
failsafe += 1
if failsafe > 100:
break
return subset_list
```

which just generates K random subsets that haven't been seen before. But this isn't exactly what I want, because I want those K subsets to be repeatable and to not accidentally be close to each if they don't have to be.