# Brackets matching using BIT

edit: I was trying to solve a spoj problem. Here is the link to the problem : http://spoj.pl/problems/BRCKTS

I can think of two possible data structures for solving the problem one using segment tree and the other using a BIT. I have already implemented the solution using a segment tree. I have read about BIT but i can't figure out how to do a particular thing with it(which i have mentioned below)

I am trying to check if brackets are balanced in a given string containing only ('s or )'s. I am using a BIT(Binary indexed tree) for solving the problem. The procedure i am following is as follows:

I am taking an array of size equal to the number of characters in the string. I am assigning -1 for ) and 1 for ( to the corresponding array elements.

Brackets are balanced in the string only if the following two conditions are true.

• The cumulative sum of the whole array is zero.
• Minimum cumulative sum is non negative. i.e the minimum of cumulative sums of all the prefixes of the array is non-negative.

Checking condition 1 using a BIT is trivial. I am facing problem in checking condition 2.

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did you choose the BIT approach or is it a homework? –  Nick Dandoulakis Feb 27 '10 at 20:54
There is a much easier solution that uses a stack. If this is homework and you are required to use a BIT, please tag it as such. –  IVlad Feb 27 '10 at 20:55
You can do this without a BIT by iterating over the string with a counter. Add 1 for every (, subtract 1 for ), check that the counter doesn't go below zero and check if it is equal to zero at the end. (Thanks Mad) –  Otto Allmendinger Feb 27 '10 at 21:01
True that works, and can be derived from the stack solution: when you read a ), remove the topmost ( from the stack. If there is none, there's no solution. When you read a ( push it on the stack. At the end, the stack has to be empty. This can easily be extended to work if you can have [ and ] as well. –  IVlad Feb 27 '10 at 21:18
No its not a homework. I am trying solve of the problems with a Online judge. As per the problem statement, using a stack would surely make my solution run out of time. I have solved the problem using a segment tree. Can i post the link to the problem?? –  amit.codename13 Feb 28 '10 at 5:05