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does someone knows a simple library to do
calculations on Polynomial with modular coefficients?

I've seen numpy, but this one seems like it does not support modular coefficients...

Thanks, Shai.

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What do you mean by modular coefficients? –  Oliver Charlesworth Jan 5 '13 at 15:02
    
I mean coefficients over Z_p for some prime p: for example 3 (mod 5) = 2 (mod 5) –  buc030 Jan 5 '13 at 15:24
    
What kind of operations do you intend to do? If it's just evaluation, then you don't need a special library. I guess if you're doing operations on the coeffs themselves, then you need some more sophistication! –  Oliver Charlesworth Jan 5 '13 at 15:52
    
Add, mult, fiv, mod, gcd, lcm, roots, stuff like this. –  buc030 Jan 5 '13 at 18:29

1 Answer 1

It suffices to lift coefficients to integers. For example if you want to compute $(1+2x+3x^2)(3+2x+x^2)$ in $Z/5[x]$, simply you compute $(1+2x+3x^2)(3+2x+x^2)$ in $Z[x]$ and reduce it to $Z/5[x]$.

Thus

import numpy.polynomial.polynomial c1 = (1,2,3) c2 = (3,2,1) numpy.fmod(numpy.polynomial.polynomial.polymul(c1,c2),5) numpy.fmod(numpy.polynomial.polynomial.polymul(c1,c2),5)

gives

array([ 3.,  3.,  4.,  3.,  3.])
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