The last couple posts have been about group pairings, specifically Tate pairings as they’re used in cryptography. This post will show that RSA encryption can be seen as a special case of pairing-based cryptography.

The idea comes from Ben Lynn’s 2007 dissertation. Lynn is the “L” in BLS signatures—one of the topics in his dissertations—and in BLS elliptic curves.

A pairing is a bilinear mapping from two groups to a third group

e: G₁ × G₂ → G_T.

Here bilinear means that if P is an element of G₁ and Q is an element of G₂, and a and b are nonnegative integers, then

e(aP, bQ) = e(P, Q)^ab.

There are more criteria for a pairing to be useful in cryptography, but we won’t need those for this post.

Ben Lynn’s dissertation mentions that exponentiation is a special case of pairing if you let G₁ and G_T be the multiplicative group of the integers mod r and let G₂ be the additive group of integers mod (r − 1). Then you can define a pairing by

e(g, a) = g^a.

Typically you can’t just write down a simple expression for a pairing, but in this case you can.

RSA encryption corresponds to r = pq where p and q are large primes. The product pq is made public but the factorization into p and q is held secret. A message [1] is encrypted by exponentiation mod n where the exponent is the public key. In Lynn’s notation, the message is g and the public key is a.

The security of RSA encryption depends on the fact that you can’t recover g from g^a mod n unless you know a trapdoor, the factorization of n [2]. This is true of pairings more generally: it is not practical to recover the inputs to a pairing from the output unless you know a trapdoor.

Related posts

• A quiet change to RSA
• My interview with John Tate
• More posts on cryptography

[1] In practice, RSA isn’t used to encrypt entire messages. Instead, it is used to encrypt a key for a symmetric encryption algorithm such as AES, and that key is used to encrypt the message. This is done for efficiency.

[2] Or, more specifically, a private key that can easily be computed if you know the factorization of n. It’s conceivable that breaking RSA encryption is easier than factoring, but so far that does not appear to be the case.

Elliptic curve Diffie-Hellman

Given a point P on an elliptic curve E, and a random number a, aP means to add P to itself a times, using the addition on E. The point aP can be computed efficiently, even if a is a very large number [1]. However, if E has a large number of points, and if a is chosen at random from a large range, then it is not practical to compute a given P and aP.

This is the elliptic curve version of the discrete logarithm problem, and its presumed difficulty is the basis of the security of Diffie-Hellman key exchange.

Two-party Diffie-Hellman

With two-party Diffie-Hellman key exchange, two parties, Alice and Bob, generate random private keys a and b respectively. They agree on a point P on an elliptic curve E. Alice computes aP and sends it to Bob. Simultaneously Bob computes bP and sends it to Alice. Then Alice can compute

a(bP) = (ab)P

and Bob can compute

b(aP) = (ba)P = (ab)P.

Then both Alice and Bob know a shared secret, the point (ab)P on E, but neither party has revealed a private key.

Three-party Diffie-Hellman

You could extend the approach above to three parties, say adding Carol, but this would require extra communication: Alice could send (ab)P to Carol, which she could multiply by her private key c to obtain abcP. Similarly, everyone else could arrive at abcP. Each person has to do a computation, send and receive a message, do another computation, and send an receive another message.

Joux [2] came up with a way to do Diffie-Hellman key exchange with three people and only one round of sending and receiving messages. The set up uses a pairing e( , ) of two elliptic curve subgroups, G₁ and G₂, as in the previous post. Fix generators P ∈ G₁ and Q ∈ G₂. Each party multiplies P and Q by their private key and sends the results to the other two parties.

Alice receives bP from Bob and cQ from Carol. This is enough for her to compute

e(bP, cQ)^a = e(P, Q)^abc.

Similarly, Bob receives aP from Alice and cQ from Carol, enabling him to compute

e(aP, cQ)^b = e(P, Q)^abc.

And finally, Carol receives aP from Alice and bQ from Bob, enabling her to compute

e(aP, bQ)^c = e(P, Q)^abc.

So all three parties can compute the shared secret e(P, Q)^abc. but no party knows the other parties’ private keys.

Footnotes

[1] If you want to multiply a point by 2¹⁰⁰, for example, you don’t carry out 2¹⁰⁰ additions; you carry out 100 doublings. Of course not every positive integer is a power of 2, but every positive integer is the sum of powers of 2, i.e. it can be written in binary. So as you’re doing your doublings, sum the terms that correspond to 1s in the binary representation of the number you’re multiplying by.

[2] Antoine Joux. A One Round Protocol for Tripartite Diffie–Hellman. Journal of Cryptology (2004) 17: 263–276.

An RSA public key is a pair of numbers (e, n) where e is an exponent and n = pq where p and q are large prime numbers. The original RSA paper said choose a private key d and compute e. In practice now we choose e and compute d. Furthermore, e is now almost always 65537 for reasons given here. So the public key is essentially just n.

Euler’s totient function

The relationship between the exponent and the private decryption key in the original RSA paper was

ed = 1 mod φ(n).

It is easy to compute e given d, or d given e, when you know Euler’s totient function of n,

φ(n) = (p − 1)(q − 1).

The security of RSA encryption rests on the assumption that it is impractical to compute φ(n) unless you know p and q.

Carmichael’s totient function

Gradually over the course of several years, the private key d changed from being the solution to

ed = 1 mod φ(n)

to being the solution to

ed = 1 mod λ(n)

where Euler‘s totient function φ(n) was replaced with Carmichael‘s totient function λ(n).

The heart of the original RSA paper was Euler’s generalization of Fermat’s little theorem which says if a is relatively prime to m, then

a^φ(n) = 1 (mod n)

Carmichael’s λ(n) is defined to be the smallest number that can replace φ(n) in the equation above. It follows that λ(n) divides φ(n).

Why the change?

Using Carmichael’s totient rather than Euler’s totient results in smaller private keys and thus faster decryption. When n = pq for odd primes p and q,

λ(n) = lcm( (p − 1), (q − 1) ) = (p − 1)(q − 1) / gcd( (p − 1), (q − 1) )

so λ(n) is smaller than φ(n) by a factor of gcd( (p − 1), (q − 1) ). At a minimum, this factor is at least 2 since p − 1 and q − 1 are even numbers.

However, an experiment suggests this was a trivial savings. When I generated ten RSA public keys the gcd was never more than 8.

from sympy import randprime, gcd

for _ in range(10):
    p = randprime(2**1023, 2**1024)
    q = randprime(2**1023, 2**1024)
    print(gcd(p-1, q-1))

I repeated the experiment with 100 samples. The median of the gcd’s was 2, the mean was 35.44, and the maximum was 2370. So the while gcd might be moderately large, but it is usually just 2 or 4.

Better efficiency

The efficiency gained from using Carmichael’s totient is minimal. More efficiency can be gained by using Garner’s algorithm.