First, for clarity in the algorithm, I'm going to change the numbers to letters: Z, A, B. The input can now be represented as a simple string: "ZAABB". Also for clarity, I'm going to insert a period at each position, for spacing: ".Z.A.A.B.B.".

This is a symbol balancing problem, easy enough to handle. Iterate through the array, keeping track of the excess at each position. `Z`

doesn't change the count; `A`

increments; `B`

decrements. This gives us

```
"00011221100".
```

Now, extract alternate counts, the count at each "spacer", the periods:

```
".Z.A.A.B.B."
"0 0 1 2 1 0"
```

From here, its simple to find matching counts. *Every* pair of matching counts gives you the indices of a substring with the same quantity of `A`

and `B`

. You have three pairs of 0 matches and one pair of 1 matches, yielding the substrings

"**0 0** 1 2 1 0" Z

"**0** 0 1 2 1 **0**" Z A A B B

"0 **0** 1 2 1 **0**" A A B B

"0 0 **1** 2 **1** 0" A B

Is that clear enough for you to implement?