Could anyone help me with this problem? I'll type out the problem, then give some of my thoughts/alternative solutions.

So the problem pretty much is, given a single string of brackets like this:

```
[[]]
```

We want to assign each bracket a group number (group 1 or group 2). A valid assignment means that if you ONLY look at brackets in group one, it forms a valid, balanced bracket string (which is pretty much stuff like [ ] [ [ ] ] and stuff NOT like ]]]][ ]. The same has to be true of group two. Groups don't have to be contiguous. We want to count the ways to split these brackets into 2 groups.

On the sample string above [ [ ] ], the answer would be six, here are the enumerations: (1 = group 1, 2 = group 2)

```
[[]]
1.1111
2.2222
3.1221
4.2112
5.1212
6.2121
```

The arrangement doesn't have to include the all groups (like in arrangements 1. and 2.)

**Thoughts**

An obvious brute force solution that works with up to 32 brackets, rather quickly, is to have a 32 bit integer representing which brackets are part of a single group. Or we could use an array. Runtime is O(2^N) (I think), which is too slow?

From looking at the problem, I think that the original string of brackets you are given has to be pre-balanced, or else there is no way to pick a subset such that group 1 and 2 are balanced.

I also noticed that you can separate components - the string "[]" has 2 arrangements, so the string "[][]" has 4 arrangements. (You can find the the number of ways in each component and multiply them together).

I'm confused on how to get these ideas into an algorithm though. I wrote the brute force program and I checked the strings "[]", "[[]]", "[[[]]]", and "[[[[]]]]", and I don't really see a pattern.

From plugging these strings into my brute force program, I get:

```
"[]" = 2
"[[]]" = 6
"[[]]" = 20
"[[[[]]]]" = 70
```

Code:

```
char buf[1000];
int N;
bool isValid(int mask)
{
int lv = 0;
for (int i = 0; i < N; i++)
{
if (mask & (1 << i))
{
if (buf[i] == '(')
{
lv++;
}
else
{
lv--;
}
if (lv<0)
{
return false;
}
}
}
return lv==0;
}
int main()
{
scanf("%s", buf);
N = strlen(buf);
int ways = 0;
for (int i = 0; i < (1 << N); i++)
{
if (isValid(i) && isValid(~i))
{
ways++;
}
}
printf("Number of ways is %d\n", ways);
return 0;
}
```

`f(AB) = f(A) * f(B)`

- since you cannot form a matching bracket with opening from A and closing from B. The hard part is calculate`f([A])`

- I know that`f([A]) = something + f(A) * 2`

since we can put the outside paren to either groups, and the inside is`f(A)`

ways, but haven't figured out the rest. – nhahtdh Nov 18 '12 at 11:12`f([A])`

case. – nhahtdh Nov 18 '12 at 15:57