Almost all cryptographic applications require the availability of numbers that are sufficiently unpredictable. Examples are the creation of keys, nonces and salts. With this library, you can generate cryptographically strong pseudo-random numbers for such use cases:
One way to relate such a list of bytes to an integer is to use CLP(FD) constraints as follows:
:- use_module(library(clpfd)). bytes_integer(Bs, N) :- foldl(pow, Bs, 0-0, N-_). pow(B, N0-I0, N-I) :- B in 0..255, N #= N0 + B*256^I0, I #= I0 + 1.
With this definition, you can generate a random 256-bit integer from a list of 32 random bytes:
?- crypto_n_random_bytes(32, Bs), bytes_integer(Bs, I). Bs = [98, 9, 35, 100, 126, 174, 48, 176, 246|...], I = 109798276762338328820827...(53 digits omitted).
The above relation also works in the other direction, letting you translate an integer to a list of bytes. In addition, you can use hex_bytes/2 to convert bytes to tokens that can be easily exchanged in your applications. This also works if you have compiled SWI-Prolog without support for large integers.