Constant time X25519 exchange

This commit is contained in:
Mark Qvist 2022-06-08 15:52:37 +02:00
parent 06fffe5a94
commit 9a4325ce8e
1 changed files with 49 additions and 26 deletions

View File

@ -1,33 +1,18 @@
"""A pure Python implementation of Curve25519
This module supports both a low-level interface through curve25519(base_point, secret)
and curve25519_base(secret) that take 32-byte blocks of data as inputs and a higher
level interface using the X25519PrivateKey and X25519PublicKey classes that are
compatible with the classes in cryptography.hazmat.primitives.asymmetric.x25519 with
the same names.
"""
# By Nicko van Someren, 2021. This code is released into the public domain.
# Small modifications for use in Reticulum, and constant time key exchange
# added by Mark Qvist in 2022.
# #### WARNING ####
# WARNING! Only the X25519PrivateKey.exchange() method attempts to hide execution time.
# In the context of Reticulum, this is sufficient, but it may not be in other systems. If
# this code is to be used to provide cryptographic security in an environment where the
# start and end times of the execution can be guessed, inferred or measured then it is
# critical that steps are taken to hide the execution time, for instance by adding a
# delay so that encrypted packets are not sent until a fixed time after the _start_ of
# execution.
# Since this code makes use of Python's built-in large integer types, it is NOT EXPECTED
# to run in constant time. While some effort is made to minimise the time variations,
# the underlying math functions are likely to have running times that are highly
# value-dependent, leaving this code potentially vulnerable to timing attacks. If this
# code is to be used to provide cryptographic security in an environment where the start
# and end times of the execution can be guessed, inferred or measured then it is critical
# that steps are taken to hide the execution time, for instance by adding a delay so that
# encrypted packets are not sent until a fixed time after the _start_ of execution.
# Implements ladder multiplication as described in "Montgomery curves and the Montgomery
# ladder" by Daniel J. Bernstein and Tanja Lange. https://eprint.iacr.org/2017/293.pdf
# Curve25519 is a Montgomery curve defined by:
# y**2 = x**3 + A * x**2 + x mod P
# where P = 2**255-19 and A = 486662
import os
import time
P = 2 ** 255 - 19
_A = 486662
@ -124,6 +109,13 @@ class X25519PublicKey:
class X25519PrivateKey:
MIN_EXEC_TIME = 0.002
MAX_EXEC_TIME = 0.5
DELAY_WINDOW = 10
T_CLEAR = None
T_MAX = 0
def __init__(self, a):
self.a = a
@ -145,4 +137,35 @@ class X25519PrivateKey:
if isinstance(peer_public_key, bytes):
peer_public_key = X25519PublicKey.from_public_bytes(peer_public_key)
return _pack_number(_raw_curve25519(peer_public_key.x, self.a))
start = time.time()
shared = _pack_number(_raw_curve25519(peer_public_key.x, self.a))
end = time.time()
duration = end-start
if X25519PrivateKey.T_CLEAR == None:
X25519PrivateKey.T_CLEAR = end + X25519PrivateKey.DELAY_WINDOW
if end > X25519PrivateKey.T_CLEAR:
X25519PrivateKey.T_CLEAR = end + X25519PrivateKey.DELAY_WINDOW
X25519PrivateKey.T_MAX = 0
if duration < X25519PrivateKey.T_MAX or duration < X25519PrivateKey.MIN_EXEC_TIME:
target = start+X25519PrivateKey.T_MAX
if target > start+X25519PrivateKey.MAX_EXEC_TIME:
target = start+X25519PrivateKey.MAX_EXEC_TIME
if target < start+X25519PrivateKey.MIN_EXEC_TIME:
target = start+X25519PrivateKey.MIN_EXEC_TIME
try:
time.sleep(target-time.time())
except Exception as e:
pass
elif duration > X25519PrivateKey.T_MAX:
X25519PrivateKey.T_MAX = duration
return shared