Summary: *Is there a way to do that? Here's what I mean: suppose I have an unsigned int number. Then I multiply it several times(and there's overflow, which is expected). Then is it possible to "revert" the original value back?*

In details:

It's all about **Rabin-Karp rolling hash**. What I need to do is: I have the hash of a long string - for example: "abcd". Then I have the hash for a shorter substring - for example "cd". How to calculate the "ab" hash with O(1), using the two given hashes?

What I have now as an algorithm:

- substract the "cd" hash from "abcd" hash (remove the last elements from the polynomial)
- devide the "abcd" hash by
`p ^ len( "cd" )`

, where`p`

is the base (prime number).

So this is:

`a * p ^ 3 + b * p ^ 2 + c * p ^ 1 + d * p ^ 0`

- **abcd**

`c * p ^ 1 + d * p ^ 0`

- **cd**

**ab** gets:

( ( a * p ^ 3 + b * p ^ 2 + c * p ^ 1 + d * p ^ 0 ) - ( c * p ^ 1 + d * p ^ 0 ) ) / ( p ^ 2 ) = a * p ^ 1 + b * p ^ 0

And this works, if I don't have an overflow (if `p`

is small number). But if it's not - it's not working.

Is there any trick or something?

P.S. The `c++`

tag is because of the number's overflow, as it is specific (and different from python, scheme or sth)

`p = 2`

this is impossible. For all other primes`p`

, itispossible... – Sven Marnach May 7 '11 at 11:36`p`

), and again subtract the before-last letter and again divide by`p`

, etc., as I don't know the strings, but only their hash.. – Kiril Kirov May 7 '11 at 12:38possible? To "revert" the number or to calculate the hash? If the second, I guess I'm gonna need to accept cnicutar's answer and ask new question about hashing ? – Kiril Kirov May 7 '11 at 12:44