Copyright | (c) 2011 Daniel Fischer |
---|---|
License | MIT |
Maintainer | Daniel Fischer <daniel.is.fischer@googlemail.com> |
Safe Haskell | None |
Language | Haskell2010 |
Factorisation proving the primality of the found factors.
For large numbers, this will be very slow in general. Use only if you're paranoid or must be really sure.
Synopsis
- certifiedFactorisation :: Integer -> [(Integer, Word)]
- certificateFactorisation :: Integer -> [((Integer, Word), PrimalityProof)]
- provenFactorisation :: Integer -> Integer -> [((Integer, Word), PrimalityProof)]
Documentation
certifiedFactorisation :: Integer -> [(Integer, Word)] Source #
produces the prime factorisation
of certifiedFactorisation
nn
, proving the primality of the factors, but doesn't report the proofs.
certificateFactorisation :: Integer -> [((Integer, Word), PrimalityProof)] Source #
produces a certificateFactorisation
nprovenFactorisation
with a default bound of 100000
.
provenFactorisation :: Integer -> Integer -> [((Integer, Word), PrimalityProof)] Source #
constructs a the prime factorisation of provenFactorisation
bound nn
(which must be positive) together with proofs of primality of the factors,
using trial division up to bound
(which is arbitrarily replaced by 2000
if the supplied value is smaller) and elliptic curve factorisation for the
remaining factors if necessary.
Construction of primality proofs can take a very long time, so this
will usually be slow (but should be faster than using factorise
and
proving the primality of the factors from scratch).