How long does it take to multiply very large integers? Using the algorithm you learned in elementary school, it takes O(n²) operations to multiply two n digit numbers. But for large enough numbers it pays to carry out multiplication very differently, using FFTs.

If you’re multiplying integers with tens of thousands of decimal digits, the most efficient algorithm is the Schönhage-Strassen algorithm, which takes

O(n log n  log log n)

operations. For smaller numbers, another algorithm, such as Karatsuba’s algorithm, might be faster. And for impractically large numbers, Fürer’s algorithm is faster.

What is impractically large? Let’s say a number is impractically large if storing it requires more than a billion dollars worth of RAM. If I did my back-of-the-envelop math correctly, you can buy enough RAM to store about 2⁵⁷ bits for about a billion dollars. The Schönhage-Strassen algorithm is more efficient than Fürer’s algorithm for numbers with less than 2⁶⁴ bits.

Related post: How fast can you multiply matrices?

The big idea of public key cryptography is that it lets you publish an encryption key e without compromising your decryption key d. A somewhat surprising detail of RSA public key cryptography is that in practice e is nearly always the same number, specifically e = 65537. We will review RSA, explain how this default e was chosen, and discuss why this may or may not be a problem.

RSA setup

Here’s the setup for RSA encryption in a nutshell.

1. Select two very large prime numbers p and q.
2. Compute n = pq and φ(n) = (p – 1)(q – 1).
3. Choose an encryption key e relatively prime to φ(n).
4. Calculate the decryption key d such that ed = 1 (mod φ(n)).
5. Publish e and n, and keep d, p, and q secret.

The asymmetry in the encryption scheme comes from the fact that the person who knows p and q can compute n, φ(n), and d easily, but no one else can find d without factoring n. (Or so it seems.)

The encryption exponent

Here we focus on the third step above. In theory e could be very large, but very often e = 65537. In that case, we don’t actually choose e to be relatively prime to φ(n). Instead, we pick p and q, and hence n, and usually φ(n) will be relatively prime to 65537, but if it’s not, we choose p and q again until gcd(65537, φ(n)) = 1. Kraft and Washington [1] have this to say about the choice of e:

… surprisingly, e does not have to be large. Sometimes e = 3 has been used, although it is usually recommended that larger values be used. In practice, the most common value is e = 65537, The advantages are that 65537 is a relatively large prime, so it’s easier to arrange that gcd(e, φ(n)) = 1, and it is one more than a power of 2, so raising a number to the 65537th power consists mostly of squarings …

In short, the customary value of e was chosen for efficiency. Also, there aren’t many choices for similar values of e [3].

Heninger and Shacham [2] go into more detail.

The choice e = 65537 = 2¹⁶ + 1 is especially widespread. Of the certificates observed in the UCSD TLS 2 Corpus (which was obtained by surveying frequently-used TLS servers), 99.5% had e = 65537, and all had e at most 32 bits.

So the “most common value” mentioned by Kraft and Washington appears to be used 99.5% of the time.

Is this a problem?

Is it a problem that e is very often the same number? At first glace no. If the number e is going to be public anyway, there doesn’t seem to be any harm in selecting it even before you choose p and q.

There may be a problem, however, that the value nearly everyone has chosen is fairly small. In particular, [2] gives an algorithm for recovering private RSA keys when some of the bits are know and the exponent e is small. How would some of the bits be known? If someone has physical access to a computer, they can recover some bits from it’s memory.

Related posts

• RSA numbers and factoring
• Why RSA should avoid similar-sized primes

[1] James S. Kraft and Lawrence C. Washington. An Introduction to Number Theory with Cryptography. 2nd edition.

[2] Nadia Heninger and Hovav Shacham. Reconstructing RSA Private Keys from Random Key Bits.

[3] The property that makes e an efficient exponent is that it is a Fermat prime, i.e. it has the form 2^2m + 1 with m = 4. Raising a number to a Fermat number exponent takes n squarings and 1 multiplication. And being prime increases the changes that it will be relatively prime to φ(n). Unfortunately 65537 may be the largest Fermat prime. We know for certain it’s the largest Fermat prime that can be written in less than a billion digits. So if there are more Fermat primes, they’re too large to use.

However, there are smaller Fermat primes than 65537, and in fact the quote from [1] mentions the smallest, 3, has been used in practice. The remaining Fermat primes are 5, 17, and 257. Perhaps these have been used in practice as well, though that may not be a good idea.

Fermat’s little theorem says that if p is a prime and a is not a multiple of p, then

a^p-1 = 1 (mod p).

Euler’s generalization of Fermat’s little theorem says that if a is relatively prime to m, then

a^φ(m) = 1 (mod m)

where φ(m) is Euler’s so-called totient function. This function counts the number of positive integers less than m and relatively prime to m. For a prime number p, φ(p) = p-1, and to Euler’s theorem generalizes Fermat’s theorem.

Euler’s totient function is multiplicative, that is, if a and b are relatively prime, then φ(ab) = φ(a) φ(b). We will need this fact below.

This post looks at three applications of Fermat’s little theorem and Euler’s generalization:

• Primality testing
• Party tricks
• RSA public key encryption

Primality testing

The contrapositive of Fermat’s little theorem is useful in primality testing: if the congruence

a^p-1 = 1 (mod p)

does not hold, then either p is not prime or a is a multiple of p. In practice, a is much smaller than p, and so one can conclude that p is not prime.

Technically this is a test for non-primality: it can only prove that a number is not prime. For example, if 2^p-1 is not congruent to 1 (mod p) then we know p is not a prime. But if 2^p-1 is congruent to 1 (mod p) then all we know is that we haven’t failed the test; it’s still conceivable that p is prime. So we try another value of a, say 3, and see whether 3^p-1 is congruent to 1 (mod p).

If we haven’t disproved that p is prime after several attempts, we have reason to believe p is probably prime.[1]. There are pseudoprimes, a.k.a. Carmichael numbers that are not prime but pass the primality test above for all values of a. But these numbers are much less common than primes.

By the way, if p is a huge number, say with hundreds or thousands of digits, doesn’t it seem odd that we would want to compute numbers to the power p? Actually computing a^p would be impossible. But because we’re computing mod p, this is actually easy. We can apply the fast exponentiation algorithm and take remainders by p at every step, so we’re never working with numbers more than twice as long as p.

Fifth root party trick

A few days ago I wrote about the fifth root party trick. If someone raises a two-digit number to the fifth power, you can quickly tell what the number was. Part of what makes the trick work is that in base 10, any number n and its fifth power end in the same digit. You can prove this by trying all 10 possible last digits, but if you want to generalize the trick to other bases, it helps to use Euler’s theorem. For example, you could use 9th powers in base 15.

Euler’s theorem shows why raising a to the power  φ(m) + 1 in base m keeps the last digit the same, but only if a is relatively prime to m. To extend the fifth root trick to other bases you’ll have a little more work to do.

RSA encryption

The original [2] RSA public key cryptography algorithm was a clever use of Euler’s theorem.

Search for two enormous prime numbers p and q [3]. Keep p and q private, but make n = pq public. Pick a private key d and solve for a public key e such that de = 1 (mod φ(n)).

Since you know p and q, you can compute φ(n) = (p – 1)(q – 1), and so you can compute the public key e. But someone who doesn’t know p and q, but only their product n, will have a hard time solving for d from knowing e. Or at least that’s the hope! Being able to factor n is sufficient to break the encryption scheme, but it’s not logically necessary. Maybe recovering private keys is much easier than factoring, though that doesn’t seem to be the case.

So where does Euler come in? Someone who has your public key e and wants to send you a message m computes

m^e (mod n)

and sends you the result [4]. Now, because you know d, you can take the encrypted message m^e and compute

(m^e)^d = m^φ(n) = m (mod n)

by Euler’s theorem.

This is the basic idea of RSA encryption, but there are many practical details to implement the RSA algorithm well. For example, you don’t want p and q to be primes that make pq easier than usual to factor, so you want to use safe primes.

Related posts

• RSA numbers and factoring
• Pascal’s triangle and Fermat’s little theorem
• Bitcoin and elliptic curves

[1] Saying that a number is “probably prime” makes sense the first time you see it. But then after a while it might bother you. This post examines and resolves the difficulties in saying that a number is “probably prime.”

[2] The original RSA paper used Euler’s totient function φ(n) = (p – 1)(q – 1), but current implementations use Carmichael’s totient function λ(n) = lcm(p – 1, q – 1). Yes, same Carmichael as Carmichael numbers mentioned above, Robert Daniel Carmichael (1879–1967).

[3] How long does it take to find big primes? See here. One of the steps in the process it to weed out composite numbers that fail the primality test above based on Fermat’s little theorem.

[4] This assumes the message has been broken down into segments shorter than n. In practice, RSA encryption is used to send keys for non-public key (symmetric) encryption methods because these methods are more computationally efficient.