The last few posts have looked at expressing an odd prime p as a sum of two squares. This is possible if and only if p is of the form 4k + 1. I illustrated an algorithm for finding the squares with p = 2²⁵⁵ − 19, a prime that is used in cryptography. It is being used in bringing this page to you if the TLS connection between my server and your browser is uses Curve25519 or Ed25519.

World records

I thought about illustrating the algorithm with a larger prime too, such as a world record. But then I realized all the latest record primes have been of the form 4k + 3 and so cannot be written as a sum of squares. Why is p mod 4 equal to 3 for all the records? Are more primes congruent to 3 than to 1 mod 4? The answer to that question is subtle; more on that shortly.

More record primes are congruent to 3 mod 4 because Mersenne primes are easier to find, and that’s because there’s an algorithm, the Lucas-Lehmer test, that can test whether a Mersenne number is prime more efficiently than testing general numbers. Lucas developed his test in 1878 and Lehmer refined it in 1930.

Since the time Lucas first developed his test, the largest known prime has always been a Mersenne prime, with exceptions in 1951 and in 1989.

Chebyshev bias

So, are more primes congruent to 3 mod 4 than are congruent to 1 mod 4?

Define the function f(n) to be the ratio of the number of primes in each residue class.

f(n) = (# primes p < n with p = 3 mod 4) / (# primes p < n with p = 1 mod 4)

As n goes to infinity, the function f(n) converges to 1. So in that sense the number of primes in each category are equal.

If we look at the difference rather than the ratio we get a more subtle story. Define the lead function to be how much the count of primes equal to 3 mod 4 leads the number of primes equal to 1 mod 4.

g(n) = (# primes p < n with p = 3 mod 4) − (# primes p < n with p = 1 mod 4)

For any n, f(n) > 1 if and only if g(n) > 0. However, as n goes to infinity the function g(n) does not converge. It oscillates between positive and negative infinitely often. But g(n) is positive for long stretches. This phenomena is known as Chebyshev bias.

Visualizing the lead function

We can calculate the lead function at primes with the following code.

from numpy import zeros
from sympy import primepi, primerange

N = 1_000_000
leads = zeros(primepi(N) + 1)
for index, prime in enumerate(primerange(2, N), start=1):
    leads[index] = leads[index - 1] + prime % 4 - 2

Here is a list of the primes at which the lead function is zero, i.e. when it changes sign.

[   0,     1,     3,     7,    13,    89,  2943,  2945,  2947,
 2949,  2951,  2953, 50371, 50375, 50377, 50379, 50381, 50393,
50413, 50423, 50425, 50427, 50429, 50431, 50433, 50435, 50437,
50439, 50445, 50449, 50451, 50503, 50507, 50515, 50517, 50821,
50843, 50853, 50855, 50857, 50859, 50861, 50865, 50893, 50899,
50901, 50903, 50905, 50907, 50909, 50911, 50913, 50915, 50917,
50919, 50921, 50927, 50929, 51119, 51121, 51123, 51127, 51151,
51155, 51157, 51159, 51161, 51163, 51177, 51185, 51187, 51189,
51195, 51227, 51261, 51263, 51285, 51287, 51289, 51291, 51293,
51297, 51299, 51319, 51321, 51389, 51391, 51395, 51397, 51505,
51535, 51537, 51543, 51547, 51551, 51553, 51557, 51559, 51567,
51573, 51575, 51577, 51595, 51599, 51607, 51609, 51611, 51615,
51617, 51619, 51621, 51623, 51627]

This is OEIS sequence A038691.

Because the lead function changes more often in some regions than others, it’s best to plot the function over multiple ranges.

The lead function is more often positive than negative. And yet it is zero infinitely often. So while the count of primes with remainder 3 mod 4 is usually ahead, the counts equal out infinitely often.

If p is an odd prime, there is a theorem that says

x² = −1 mod p

has a solution if and only if p = 1 mod 4. When a solution x exists, how do you find it?

The previous two posts have discussed Stan Wagon’s algorithm for expressing an odd prime p as a sum of two squares. This is possible if and only if p = 1 mod 4, the same condition on p for −1 to have a square root.

In the previous post we discussed how to find c such that c does not have a square root mod p. This is most of the work for finding a square root of −1. Once you have c, set

x = c^k

where p = 4k + 1.

For example, let’s find a square root of −1 mod p where p = 2²⁵⁵ − 19. We found in the previous post that c = 2 is a non-residue for this value of p.

>>> p = 2**255 - 19
>>> k = p // 4
>>> x = pow(2, k, p)

Let’s view x and verify that it is a solution.

>>> x
19681161376707505956807079304988542015446066515923890162744021073123829784752
>>> (x**2 + 1) % p
0

Sometimes you’ll see a square root of −1 mod p written as i. This makes sense in context, but it’s a little jarring at first since here i is an integer, not a complex number.

The next post completes this series, giving a full implementation of Wagon’s algorithm.

I saw where Elon Musk posted Grok’s answer to the prompt “What are the most beautiful theorems.” I looked at the list, and there were no surprises, as you’d expect from a program that works by predicting the most likely sequence of words based on analyzing web pages.

There’s only one theorem on the list that hasn’t appeared on this blog, as far as I can recall, and that’s Fermat’s theorem that an odd prime p can be written as the sum of two squares if and only if p = 1 mod 4. The “only if” direction is easy [1] but the “if” direction takes more effort to prove.

If p is a prime and p = 1 mod 4, Fermat’s theorem guarantees the existence of x and y such that

Gauss’ formula

Stan Wagon [2] gave an algorithm for finding a pair (x, y) to satisfy the equation above [2]. He also presents “a beautiful formula due to Gauss” which “does not seem to be of any value for computation.” Gauss’ formula says that if p = 4k + 1, then a solution is

For x and y we choose the residues mod p with |x| and |y| less than p/2.

Why would Wagon say Gauss’ formula is computationally useless? The number of multiplications required is apparently on the order of p and the size of the numbers involved grows like p!.

You can get around the problem of intermediate numbers getting too large by carrying out all calculations mod p, but I don’t see a way of implementing Gauss’ formula with less than O(p) modular multiplications [3].

Wagon’s algorithm

If we want to express a large prime p as a sum of two squares, an algorithm requiring O(p) multiplications is impractical. Wagon’s algorithm is much more efficient.

You can find the details of Wagon’s algorithm in [3], but the two key components are finding a quadratic non-residue mod p (a number c such that c ≠ x² mod p for any x) and the Euclidean algorithm. Since half the numbers between 1 and p − 1 are quadratic non-residues, you’re very likely to find a non-residue after a few attempts.

[1] The square of an integer is either equal to 0 or 1 mod 4, so the sum of two squares cannot equal 3 mod 4.

[2] Stan Wagon. The Euclidean Algorithm Strikes Again. The American Mathematical Monthly, Vol. 97, No. 2 (Feb., 1990), pp. 125-129.

[3] Wilson’s theorem gives a fast way to compute (n − 1)! mod n. Maybe there’s some analogous identity that could speed up the calculation of the necessary factorials mod p, but I don’t know what it would be.

Suppose I give you a big number F and claim that F is a Fibonacci number. How could you confirm this?

Before I go further, let me say what this post is really about. It’s not about Fibonacci numbers so much as it is about proofs and certificates. There’s no market for large Fibonacci numbers, and certainly no need to quickly verify that a number is a Fibonacci number.

You could write a program to generate Fibonacci numbers, and run it until it either produces F , in which case you know F is a Fibonacci number, or the program produces a larger number than F without having produced F, in which case you know it’s not a Fibonacci number. But there’s a faster way.

A certificate is data that allows you to confirm a solution to a problem in less time, usually far less time, than it took to generate the solution. For example, Pratt certificates give you a way to prove that a number is prime. For a large prime, you could verify its Pratt certificate much faster than directly trying to prove the number is prime.

There is a theorem that says a number f is a Fibonacci number if and only if one of 5f² ± 4 is a perfect square. So in addition to F another number r that is a certificate that F is a Fibonacci number. You compute

N = 5F² − r²

and if N is equal to 4 or −4, you know that F is a Fibonacci number. Otherwise it is not.

Here’s a small example. Suppose I give you (12586269025, 28143753123) and claim that the first number is a Fibonacci number and the second number is its certificate. You can compute

5 × 12586269025² − 28143753123²

and get −4, verifying the claim.

Certificates are all about the amount of computation the verifier needs to do. The prover, i.e. the person producing the certificate, has to do extra work to provide a certificate in addition to a problem solution. This trade-off is acceptable, for example, in a blockchain where a user posts one transaction but many miners will verify many transactions.

Related posts

• Elliptic curve primality certificates
• Generation versus verification costs
• Proof of optimization
• Zero knowledge proof of compositeness