ansible-later/env_27/lib/python2.7/site-packages/paramiko/primes.py

149 lines
5.0 KiB
Python
Raw Normal View History

# Copyright (C) 2003-2007 Robey Pointer <robeypointer@gmail.com>
#
# This file is part of paramiko.
#
# Paramiko is free software; you can redistribute it and/or modify it under the
# terms of the GNU Lesser General Public License as published by the Free
# Software Foundation; either version 2.1 of the License, or (at your option)
# any later version.
#
# Paramiko is distributed in the hope that it will be useful, but WITHOUT ANY
# WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR
# A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more
# details.
#
# You should have received a copy of the GNU Lesser General Public License
# along with Paramiko; if not, write to the Free Software Foundation, Inc.,
# 59 Temple Place, Suite 330, Boston, MA 02111-1307 USA.
"""
Utility functions for dealing with primes.
"""
import os
from paramiko import util
from paramiko.py3compat import byte_mask, long
from paramiko.ssh_exception import SSHException
def _roll_random(n):
"""returns a random # from 0 to N-1"""
bits = util.bit_length(n - 1)
byte_count = (bits + 7) // 8
hbyte_mask = pow(2, bits % 8) - 1
# so here's the plan:
# we fetch as many random bits as we'd need to fit N-1, and if the
# generated number is >= N, we try again. in the worst case (N-1 is a
# power of 2), we have slightly better than 50% odds of getting one that
# fits, so i can't guarantee that this loop will ever finish, but the odds
# of it looping forever should be infinitesimal.
while True:
x = os.urandom(byte_count)
if hbyte_mask > 0:
x = byte_mask(x[0], hbyte_mask) + x[1:]
num = util.inflate_long(x, 1)
if num < n:
break
return num
class ModulusPack(object):
"""
convenience object for holding the contents of the /etc/ssh/moduli file,
on systems that have such a file.
"""
def __init__(self):
# pack is a hash of: bits -> [ (generator, modulus) ... ]
self.pack = {}
self.discarded = []
def _parse_modulus(self, line):
(
timestamp,
mod_type,
tests,
tries,
size,
generator,
modulus,
) = line.split()
mod_type = int(mod_type)
tests = int(tests)
tries = int(tries)
size = int(size)
generator = int(generator)
modulus = long(modulus, 16)
# weed out primes that aren't at least:
# type 2 (meets basic structural requirements)
# test 4 (more than just a small-prime sieve)
# tries < 100 if test & 4 (at least 100 tries of miller-rabin)
if (
mod_type < 2
or tests < 4
or (tests & 4 and tests < 8 and tries < 100)
):
self.discarded.append(
(modulus, "does not meet basic requirements")
)
return
if generator == 0:
generator = 2
# there's a bug in the ssh "moduli" file (yeah, i know: shock! dismay!
# call cnn!) where it understates the bit lengths of these primes by 1.
# this is okay.
bl = util.bit_length(modulus)
if (bl != size) and (bl != size + 1):
self.discarded.append(
(modulus, "incorrectly reported bit length {}".format(size))
)
return
if bl not in self.pack:
self.pack[bl] = []
self.pack[bl].append((generator, modulus))
def read_file(self, filename):
"""
:raises IOError: passed from any file operations that fail.
"""
self.pack = {}
with open(filename, "r") as f:
for line in f:
line = line.strip()
if (len(line) == 0) or (line[0] == "#"):
continue
try:
self._parse_modulus(line)
except:
continue
def get_modulus(self, min, prefer, max):
bitsizes = sorted(self.pack.keys())
if len(bitsizes) == 0:
raise SSHException("no moduli available")
good = -1
# find nearest bitsize >= preferred
for b in bitsizes:
if (b >= prefer) and (b <= max) and (b < good or good == -1):
good = b
# if that failed, find greatest bitsize >= min
if good == -1:
for b in bitsizes:
if (b >= min) and (b <= max) and (b > good):
good = b
if good == -1:
# their entire (min, max) range has no intersection with our range.
# if their range is below ours, pick the smallest. otherwise pick
# the largest. it'll be out of their range requirement either way,
# but we'll be sending them the closest one we have.
good = bitsizes[0]
if min > good:
good = bitsizes[-1]
# now pick a random modulus of this bitsize
n = _roll_random(len(self.pack[good]))
return self.pack[good][n]