# Why this binary search implementation causes overflow

In the implementation of binary search

``````int search(int[] A, int K) {
int l = 0;
int u = A.length - 1;
int m
while ( l <= u ) {
m = (l+u)/2; // why this can cause overflow
...
}
}
``````

The correct method is as follows:

``````m = l + (u -l )/2;
``````

I don't know why the updated statement has no overflow issue. Based on my understanding, soon or later, the updated statement will also have overflow issue.

Thank you

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could you explain how the updated statement overflows –  David Heffernan Jan 21 '11 at 23:15
don't you mean: m = (l + (u -l ))/2; ? –  Yochai Timmer Jan 21 '11 at 23:17
@Yochai: No, because that would just be u/2. His calculation is correct (although the loop condition is not). –  Peter Alexander Jan 21 '11 at 23:33
yea, didn't notice that. it's late lol –  Yochai Timmer Jan 21 '11 at 23:35
@David, originally, I assume that the l and u can start with a overflowed number. But I think we should not make that assumption. -- thx –  q0987 Jan 21 '11 at 23:52

## 1 Answer

The orignal may have overflow because `l+u` could be greater than the maximum value an `int` can handle (e.g. if both `l` and `u` were `INT_MAX` then their sum would obviously exceed `INT_MAX`).

The correct method can't overflow, because `u-l` obviously won't overflow, and `l+(u-l)/2` is guaranteed to be `<=u`, so can't overflow either.

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@Yochai: You can't do that, because if l=3 and u=5, m = l/2 + u/2 = 1 + 2 = 3, but you want m = 4. –  Peter Alexander Jan 22 '11 at 0:06