This is an example of an optimization problem. It is a very well
studied type of problems with very good methods to solve them. Read
Programming Collective Intelligence which explains it much better
than me.

Basically, there are three parts to any kind of optimization problem.

- The
**input** to the problem solving function.
- The
**solution outputted** by the problem solving function.
- A scoring function that evaluates how optimal the solution is by
scoring it.

Now the problem can be stated as finding the solution that produces
the highest score. To do that, you first need to come up with a format
to represent a possible solution that the scoring function can then
score. Assuming 6 persons (0-5) and 3 groups (0-2), this python data structure
would work and would be a possible solution:

```
output = [
[0, 1],
[2, 3],
[4, 5]
]
```

Person 0 and 1 is put in group 0, person 2 and 3 in group 1 and so
on. To score this solution, we need to know the input and the rules for
calculating the output. The input could be represented by this data
structure:

```
input = [
[0, 4, 1, 3, 4, 1, 3, 1, 3],
[5, 0, 1, 2, 1, 5, 5, 2, 4],
[4, 1, 0, 1, 3, 2, 1, 1, 1],
[2, 4, 1, 0, 5, 4, 2, 3, 4],
[5, 5, 5, 5, 0, 5, 5, 5, 5],
[1, 2, 1, 4, 3, 0, 4, 5, 1]
]
```

Each list in the list represents the rating the person gave. For
example, in the first row, the person 0 gave rating 0 to person 0 (you
can't rate yourself), 4 to person 1, 1 to person 2, 3 to 3, 4 to 4 and
1 to person 5. Then he or she rated the groups 0-2 3, 1 and 3
respectively.

So above is an example of a valid solution to the given input. How do
we score it? That's not specified in the question, only that the
"best" combination is desired therefore I'll arbitrarily decide that
the score for a solution is the sum of each persons happiness. Each
persons happiness is determined by adding his or her rating of the
group with the average of the rating for each person in the group,
excluding the person itself.

Here is the scoring function:

```
N_GROUPS = 3
N_PERSONS = 6
def score_solution(input, output):
tot_score = 0
for person, ratings in enumerate(input):
# Check what group the person is a member of.
for group, members in enumerate(output):
if person in members:
# Check what rating person gave the group.
group_rating = ratings[N_PERSONS + group]
# Check what rating the person gave the others.
others = list(members)
others.remove(person)
if not others:
# protect against zero division
person_rating = 0
else:
person_ratings = [ratings[o] for o in others]
person_rating = sum(person_ratings) / float(len(person_ratings))
tot_score += group_rating + person_rating
return tot_score
```

It should return a score of 37.0 for the given solution. Now what
we'll do is to generate valid outputs while keeping track of which one
is best until we are satisfied:

```
from random import choice
def gen_solution():
groups = [[] for x in range(N_GROUPS)]
for person in range(N_PERSONS):
choice(groups).append(person)
return groups
# Generate 10000 solutions
solutions = [gen_solution() for x in range(10000)]
# Score them
solutions = [(score_solution(input, sol), sol) for sol in solutions]
# Sort by score, take the best.
best_score, best_solution = sorted(solutions)[-1]
print 'The best solution is %s with score %.2f' % (best_solution, best_score)
```

Running this on my computer produces:

```
The best solution is [[0, 1], [3, 5], [2, 4]] with score 47.00
```

Obviously, you may think it is a really stupid idea to randomly just
generate solutions to throw at the problem, and it is. There are much
more sophisticated methods to generate solutions such as simulated
annealing or genetic optimization. But they all build upon the same
framework as given above.