shady-crypt v5.0.3
SHADY-CRYPT.js
About Shady Crypt:
Shady Crypt is a new password hashing and cryptographically secure pseudo-random number generator (CSPRNG) library, optimized from the ground up to run natively on Node.js / the Chrome V8 JavaScript engine.
Hashing Algorithm
With the notable exceptions of MD5 and SHA-1 1, most modern hash functions are not practically susceptible to collision/second pre-image attacks -- although the fixed 184 bit digest size of BCrypt does theoretically open the door in this regard 2. Rather, the main line of attack has been brute-force password guessing, guided by dictionaries, pattern checking, word list substitution, etc. This makes it imperative that a chosen hashing algorithm does not allow an attacker to make too many guesses too quickly.
Unfortunately, many commonly used hashing algorithms are highly parallelizable, allowing password guessing to be accelerated tremendously on specialized hardware, including application-specific integrated circuits (ASICs), field-programmable gate arrays (FPGAs), and high-end graphical processing units (GPUs) 3. Ntantogian, et al, were able to achieve a rate of over 21 billion hashes per second from the MD5 algorithm utilizing an NVIDIA GTX 1070 graphics card -- currently available refurbished for around $400. And even more powerful GPUs are easily rented on cloud platforms such as AWS, Google Cloud, Oracle, and Microsoft Azure 4.
BCrypt was introduced in 1999 in response to such parallel computing / hardware-accelerated password guessing concerns when the main threat were ASICs with low gate counts 5. However, with recent advances in FPGA technology, there are now published BCRYPT implementations that achieve a high level of parallelization in embedded hardware devices 6.
Later memory hard functions (MHFs) such as SCrypt and Argon2 took a different tactic, using the physical memory as much as possible to limit the level of parallelism that an attacker could achieve and thus significantly increasing the cost required to crack a password with specialized hardware. However, with the rise of high bandwidth memory (HBM) enhanced FPGAs 8, the long-term soundness of this approach is somewhat in doubt. Moreover, the amount of memory consumption needed to implement Argon2 effectively as an MHF can also open the door to denial of service (DoS) attacks due to the substantial physical memory requirements of responding to multiple concurrent login attempts.
Shady Crypt was designed with a different, somewhat simpler approach in mind: An adjustable-speed hashing algorithm that maximizes the critical path length in order to minimize the theoretically possible speedup from parallel computation (cf. Amdahl’s Law 9). If an attacker has K times the sequential processing power (but not necessarily K times the memory), the attacker will be able to run the algorithm K times as quickly. But they will have to pay full price for that extra computing power, as opposed to obtaining the same speedup by buying FPGAs / renting GPUs and parallelizing the algorithm.
Like BCrypt, Shady Crypt makes frequent access to a table that is constantly altered throughout the algorithm execution. This sort of pseudorandom access to memory, while fast on a CPU, is much less so on a GPU, where memory is shared and all cores compete for control of the internal memory bus.
However, Shady Crypt also utilizes the ranged Asymmetric Numeral System (rANS) 10 and tabled Asymmetric Numeral System (tANS) 11 approaches of Jarek Duda 12 14 in combination with multiple different methods (most obvious, some perhaps not so much) in order to ensure that most of the algorithm's operations must be performed sequentially in order to arrive at the correct hashed output.
CSPRNG
The Shady Crypt library also includes a native JavaScript implementation of a cryptographically secure pseudo-random number generator (CSPRNG) based upon the above principles that passes the complete TestU01 15 160-statistic "Big Crush" testing battery (which the user may confirm by downloading the repo and running the attached test programs -- see "implementation," below). The Shady Crypt CSPRNG runs at about half the speed of the native (and highly insecure) Math.random() method, but significantly faster than any other CSPRNG for JavaScript/Node.js of which we are aware.
Implementation
For details on implementation, please visit the Shady Crypt repo at https://github.com/REgonLevy/shady-crypt.
Installation:
To install via NPM, run:
npm install shady-cryptUsage:
To use Shady Crypt, you must first require in the package:
const shady = require('shady-crypt');In order to hash a password, simply provide the password and desired “work factor” between 1 and 262143 (the default value of 1 is sufficient, with a time cost of 100 to 110 ms on most servers -- each additional increment gives a c. 50 ms increase in time cost). Shady Crypt will automatically generate a unique salt each time you hash a password (in the example below, password is the plain-text password as a string and hash is the hashed output for that user, containing both salt and hash):
shady.hash(password, 1, hash => {
// Do something with the hash / store it somewhere.
}, error => {
// Handle error.
});In order to check a password against a stored hash value, enter the password (password) and stored hash (hash):
shady.verify(password, hash, result => {
// Do something with the true/false result of whether the password was verified against the stored hash.
}, error => {
// Handle error.
})To generate a secure random floating point number between 0 and 1 (the same format as Math.random() ), first create a new random number generator by invoking the Shady Crypt random method (you must invoke the method because each new generator stores its seed / state / table information as a closure):
const rand = shady.random();Then use your new generator to generate random numbers the same as you would use Math.random():
let x = rand(); // x will be a value between 0 and 1;
let y = Math.floor(rand() * 20); // y will be an integer between 0 and 19The shady.randomInt() method works the same way except the result is a random signed, 32 bit integer between -2147483648 and 2147483647:
const randInt = shady.randInt();
let x = randInt();
// x will be an integer between -2147483648 and 2147483647.
let y = randInt() < 0;
// y will have a 50-50 chance of being either true (if the number is negative) or false.References:
1 Andreeva, E., Bouillaguet, C., Dunkelman, O. et al, “New Second-Preimage Attacks on Hash Functions.” J Cryptol 29, 657–696 (2016).
2 Dooley, J. F., History of Cryptography and Cryptanalysis: Codes, Ciphers, and Their Algorithms (Springer, 2018), pp. 181-183.
3 Ntantogian C., Malliaros S. and Xenakis C., “Evaluation of password hashing schemes in open source web platforms,” Computers & Security, 84, (2019).
4 “GPU Cloud Computing Solutions,” NVIDIA Online. Available: https://www.nvidia.com/en-us/data-center/gpu-cloud-computing/ Accessed August 12, 2020.
5 Contini, S., “Method to protect passwords in databases for web applications,” IACR Cryptology ePrint Archive, 387 (2015).
6 Wiemer, F. and Zimmermann, R., “High-speed implementation of bcrypt password search using special-purpose hardware,” in International Conference on ReConFigurable Computing and FPGAs (2014).
7 Malvoni, K., Designer, S., and Knezovic, J., “Are Your Passwords Safe: Energy-Efficient Bcrypt Cracking with Low-Cost Parallel Hardware,” in 8th USENIX Workshop on Offensive Technologies (2014).
8 Wang, Z., Huang, H., Zhang, J. and Alonso, G., “Benchmarking High Bandwidth Memory on FPGAs,” (2020). Preprint. Available: https://arxiv.org/pdf/2005.04324.pdf Accessed August 12, 2020.
9 Hill, M. D., and Marty, M. R., “Amdahl's Law in the Multicore Era,” in Computer, 41 (2008), pp. 33-38.
10 Giesen, F., https://github.com/rygorous/ryg_rans. Accessed: August 12, 2020.
11 Duda, J. https://github.com/JarekDuda/AsymmetricNumeralSystemsToolkit Accessed: August 12, 2020.
12 Duda, J., “Asymmetric numeral systems”. In: ArXiv e-prints (2009). arXiv: 0902.0271 cs.IT.
13 Duda., J., “Asymmetric numeral systems: entropy coding combining speed of Huffman coding with compression rate of arithmetic coding”. In: ArXiv e-prints (2013). arXiv: 1311.2540 cs.IT.
14 Duda, J., and Niemiec, M., “Lightweight compression with encryption based on Asymmetric Numeral Systems”. In: ArXiv e-prints (2016). arXiv: 1612.04662 cs.IT.
15 L’Ecuyer, P. and Simard, R., TestU01: A software library in ANSI C for empirical testing of random number generators, User's Guide, DIRO, University of Montreal (2013), http://simul.iro.umontreal.ca/testu01/.