tried to reduce from the given result (every possible play- 1,2,3 points) using recursion until i get to 0 but for that i need global variable and i cant use one.

Maybe this is where you reveal what you need. You can avoid a global by passing the current count and/or returning the used count (or remaining count) as needed.

In your case I think you would just pass the points to the recursive function and have it return the counts. The return values would be added so the final total would roll-up as the recursion unwinds.

## Edit

I wrote a function that was able to generate correct results. This question is tagged "memoization", using it gives a **huge** performance boost. Without it, the same sub-sequences are processed again and again. I used a decorator to implement memoization.

I liked @Maxwell's separate handling of teams, but that approach will not generate the numbers you are looking for. (Probably because your original wording was not at all clear, I've since rewritten your problem description). I wound up processing the 6 home and visitor scoring possibilities in a single function.

My counts were wrong until I realized what I needed to count was the number of times I hit the terminal condition.

## Solution

Other solutions have been posted. Here's my (not very readable) one-liner:

```
def bball(vscore, hscore):
return 1 if vscore == 0 and hscore == 0 else \
sum([bball(vscore-s, hscore) for s in range(1,4) if s <= vscore]) + \
sum([bball(vscore, hscore-s) for s in range(1,4) if s <= hscore])
```

Actually I also have this line just before the function definition:

```
@memoize
```

I used Michele Simionato's decorator module and memoize sample. Though as @Blckknght mentioned the function is commutative so you could customize memoize to take advantage of this.

While I like the separation of concerns provided by generic memoization, I'm also tempted to initialize the cache with (something like):

```
cache = {(0, 0): 1}
```

and remove the special case check for 0,0 args in the function.

`m`

and`n`

stand for? I also agree with @dusan that you should show what you have tried, otherwise this is just a "give me teh codez" question which will likely be closed. – Benjamin Bannier Dec 4 '12 at 21:23`3*x1 + 2*y1 + z1 = N1`

and`3*x2 + 2*y2 + z2 = N2`

, or sequences like "team A scores 2, team B scores 1, team B scores 2", or even "the sequence of scores of team A are: 2,2,3... and the sequence of scores of team B are: 1,2,1...". These are three completely different problems. – nvlass Dec 4 '12 at 21:40