# multiplying polynomials in GF(2) [closed]

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You need to provide more information regarding the problems you have with this. Is it the maths? Is it conversion to code? Is your code throwing up an error? –  Oded Jan 28 '10 at 11:22

## closed as not a real question by Steve Guidi, Bryan Crosby, j0k, AProgrammer, mu is too shortAug 26 '12 at 9:04

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You would probably want to use bitwise operators, and represent the polynomials using the `ulong` or `uint` type. That is, if P64(GF(2)) is acceptable. If not, you will have to use some other trick.

``````ulong a, b;
// Compute r = x * y
ulong r = 0;
for (uint i = 0; i < 64; ++i) {
if ((a & (1 << i)) != 0) {
r ^= b << i;
}
}
``````

A summary of the representation:

• `z & (1 << i)` selects the xi coefficient from z(x)
• `r ^= b << i` computes r'(x) = r(x) + b(x)*xi

Disclaimer: I am not a C# programmer.

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OK.

• define a class which represents a Galois Field.
• define a class which represents a polynomial over a field.
• define a multiplication operator on polynomials
• and you're done.

Perhaps you can be more explicit about the step where you're having problems.

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Wow, that's a big question, which mostly depends on the type of the fields you have to use.

A good introduction is Sage's manual page for finite fields computation.

Executive Summary: For small fields (|F|<216) use tables of Zech logs via the Givaro C++ library. For bigger fields use `PARI`. Fields of characteristic 2 (which is what you need) use `NTL`.

A paper about implementation of fields is available at ACM, it describes how was it done with Maxima Computer Algebra System.

But if you just need a small toy library to factor polynomials over fields for homework assignment here's what I would do:

1. Create a class which represents a polynomial, it should adds multiply and divides polynomials. A polynomial is easily representable as an array. Make the polynomial class a generic class, like so `Polynomial<coefficient_type>`.
2. Create a class which represents the group Zp, for prime `p`. This class will be the coefficients of the polynomial. Use Z2 for your fields.
3. Create a class that factors a polynomial.
4. To represent GF(pk) find an irreducible polynomial of degree k, and all polynomials of degree up to k over Zp are your elements.
6. After multiplying two polynomials, make sure you divide the result modulo the irreducible polynomial chosen in `4`.