Bill Hart’s quadratic sieve is included with Sage. The quadratic sieve
is the best algorithm for factoring numbers of the form 
up
to around 100 digits. It involves searching for relations, solving a
linear algebra problem modulo 
, then factoring 
using a relation 
.
sage: qsieve(next_prime(2^90)*next_prime(2^91), time=True) # not tested
([1237940039285380274899124357, 2475880078570760549798248507],
'14.94user 0.53system 0:15.72elapsed 98%CPU (0avgtext+0avgdata 0maxresident)k')
Using qsieve is twice as fast as Sage’s general factor command in this example. Note that Sage’s general factor command does nothing but call Pari’s factor C library function.
sage: time factor(next_prime(2^90)*next_prime(2^91)) # not tested
CPU times: user 28.71 s, sys: 0.28 s, total: 28.98 s
Wall time: 29.38 s
1237940039285380274899124357 * 2475880078570760549798248507
Obviously, Sage’s factor command should not just call Pari, but nobody has gotten around to rewriting it yet.
Paul Zimmerman’s GMP-ECM is included in Sage. The elliptic curve
factorization (ECM) algorithm is the best algorithm for factoring
numbers of the form 
, where 
is not “too
big”. ECM is an algorithm due to Hendrik Lenstra, which works by
“pretending” that is prime, chosing a random elliptic curve
over 
, and doing arithmetic on that
curve–if something goes wrong when doing arithmetic, we factor
.
In the following example, GMP-ECM is over 10 times faster than Sage’s generic factor function. Again, this emphasizes that Sage’s generic factor command would benefit from a rewrite that uses GMP-ECM and qsieve.
sage: time ecm.factor(next_prime(2^40) * next_prime(2^300)) # not tested
CPU times: user 0.85 s, sys: 0.01 s, total: 0.86 s
Wall time: 1.73 s
[1099511627791,
2037035976334486086268445688409378161051468393665936250636140449354381299763336706183397533]
sage: time factor(next_prime(2^40) * next_prime(2^300)) # not tested
CPU times: user 23.82 s, sys: 0.04 s, total: 23.86 s
Wall time: 24.35 s
1099511627791 * 2037035976334486086268445688409378161051468393665936250636140449354381299763336706183397533