# Toom-Cook multiplication algorithm implementation

I have a task to implement Toom-Cook 3-way multiplication algorithm. I'm following description on wikipedia http://en.wikipedia.org/wiki/Toom%E2%80%93Cook_multiplication , and I managed to store two big numbers into strings and split the strings into smaller ones according to the "Splitting" step on the wikipedia page. The next step is "evaluation", and I have to calculate a new number p0 = m0 + m2 ("Faster evaluation" by Bordrato - found on the same page) where m0 and m2 are the digits which I created by splitting the large number (in the previous step). The problem is that I cannot simply add up m0 and m2, since those two numbers can still be very large and impossible to add together in a standard way. Does this mean that I have to implement my own algorithm for adding large numbers (as well as substracting and dividing, since they are also needed), or am I missing something? If anyone could link me a possible implementation or even a pseudo code, it would be appreciated.

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Adding up two big integers is very very simple. Add and carry, add and carry, add and carry... Subtraction is similarly easy. Division is slightly tougher, but it's basically just long division on arrays. –  Patashu May 8 '13 at 0:28

LibTomMath is open source and includes a Toom-Cook multiplication; have a look.

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You have to implement your own methods for addition, subtraction, modulo, etc. Sometime ago I was trying to implement a BigInteger library and I have found some resources that may be useful for you.

• BigNum Math book (as pointed by the previous answer)
• Java OpenJdk BigInteger implementation, with documentation
• Algorithms and data structures The basic toolbox, (I have learned Karatsube of this book).

By the way, I recommend to use base 2 for your numbers(see here.) because you can take advantage of the nature of the computer to make your operations more easy and fast.

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