(passlib developer here)
The amount of time pbkdf2_sha512 takes is linearly proportional to it's rounds parameter (
elapsed_time = rounds * native_speed). Using the data for your system,
native_speed = 12000 / .143 = 83916 iterations/second, which means you'll need around
83916 * .350 = 29575 rounds to get ~350ms delay.
Things are a little tricker for bcrypt, because the amount of time it takes is logarithmically proportional to it's rounds parameter (
elapsed_time = (2 ** rounds) * native_speed). Using the data for your system,
native_speed = (2 ** 12) / .405 = 10113 iterations/second, which means you'll need around
log(10113 * .350, 2) = 11.79 rounds to get ~350 ms delay. But since BCrypt only accepts integer rounds parameters, so you'll need to pick
rounds=11 (~200ms) or
All of this is something I'm hoping to fix in a future release of passlib. As a work in progress, passlib's mercurial repo currently contains a simple little script, choose_rounds.py, which takes care of choosing the correct rounds value for a given target time. You can download and run it directly as follows (it may take 20s or so to run):
$ python choose_rounds.py -h
usage: python choose_rounds.py <hash_name> [<target_in_milliseconds>]
$ python choose_rounds.py pbkdf2_sha512 350
speed...........: 83916 iterations/second
target time.....: 350 ms
target rounds...: 29575
$ python choose_rounds.py bcrypt 350
speed...........: 10113 iterations/second
target time.....: 350 ms
target rounds...: 11 (200ms -- 150ms faster than requested)
target rounds...: 12 (400ms -- 50ms slower than requested)
(edit: added response regarding secure minimum rounds...)
Disclaimer: Determining a secure minimum is a surprisingly tricky question - there are a number of hard to quantify parameters, very little real world data, and some rigorously unhelpful theory. Lacking a good authority, I've been researching the topic myself; and for off-the-cuff calculations, I've boiled the raw data down to a short formula (below), which is generally what I use. Just be aware that behind it are a couple of pages of assumptions and rough estimates, making it more of a Fermi Estimation than an exact answer :|
My rule of thumb (mid 2012) for attacking PBKDF2-HMAC-SHA512 using GPUs is:
days * dollars = 2**(n-31) * rounds
days is the number of days before the attacker has a 50/50 chance of guessing the password.
dollars is the attackers' hardware budget (in $USD).
n is the average amount of entropy in your user's passwords (in bits).
To answer your script-kiddie question: if an average password has 32 bits of entropy, and the attacker has a $2000 system with a good GPU, then at 30000 rounds they will need 30 days (
2**(32-31)*30000/2000) to have a 50/50 chance of cracking a given hash. I'd recommend playing around with the values until you arrive at a rounds/days tradeoff that you're comfortable with.
Some things to keep in mind:
The success rate of a dictionary attack isn't linear, it's more of "long tail" situation, so think of the 50/50 mark as more of a half-life.
31 is the key factor, as it encodes an estimation of the cost of attacking a specific algorithm using a specific technology level. The actual value,
2**-31, measures the "dollar-days per round" it will cost an attacker. For comparison, attacking PBKDF2-HMAC-SHA512 using an ASIC has a factor closer to
46 -- larger numbers mean more bang for the attacker's buck, and less security per round for you, though script kiddies generally won't have that kind of budget :)