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Approximating Markov’s equation

2026-05-19 20:09:54

Markov numbers are integer solutions to

x² + y² + z² = 3xyz.

The Wikipedia article on Markov numbers mentions that Don Zagier studied Markov numbers by looking the approximating equation

x² + y² + z² = 3xyz + 4/9

which is equivalent to

f(x) + f(y) = f(z)

where f(t) is defined as arccosh(3t/2). It wasn’t clear to me why the two previous equations are equivalent, so I’m writing this post to show that they are equivalent.

Examples

Before showing the equivalence of Zagier’s two equations, let’s look at an example that shows solutions to his second equation approximate solutions to Markov’s equation.

The following code verifies that (5, 13, 194) is a solution to Markov’s equation.

x, y, z = 5, 13, 194
assert(x**2 + y**2 + z**2 == 3*x*y*z)

With the same x and y above, let’s show that the z in Zagier’s second equation is close to the z above.

from math import cosh, acosh

f = lambda t: acosh(3*t/2)
g = lambda t: cosh(t)*2/3
z = g(f(x) + f(y))
print(z)

This gives z = 194.0023, which is close to the value of z in the Markov triple above.

Applying Osborn’s rule

Now suppose

f(x) + f(y) = f(z)

which expands to

arccosh(3x/2) + arccosh(3y/2) = arccosh(3z/2).

It seems sensible to apply cosh to both sides. Is there some identity for cosh of a sum? Maybe you recall the equation for cosine of a sum:

cos(a + b) = cos(a) cos(b) − sin(a) sin(b).

Then Osborn’s rule says the corresponding hyperbolic identity is

cosh(a + b) = cosh(a) cosh(b) − sinh(a) sinh(b).

Osborn’s rule also says that the analog of the familiar identity

sin²(a) + cos²(b) = 1

sinh²(a) = cosh²(b) − 1.

From these two hyperbolic identities we can show that

cosh( arccosh(a) + arccosh(b) ) = ab + √(a² − 1) √(b² − 1).

Slug it out

The identity derived above is the tool we need to reduce our task to routine algebra.

arccosh(3x/2) + arccosh(3y/2) = arccosh(3z/2)

then

(3x/2) (3y/2) + √((3x/2)² − 1) √((3y/2)² − 1) = 3z / 2

which simplifies to Zagier’s equation

x² + y² + z² = 3xyz + 4/9.

The post Approximating Markov’s equation first appeared on John D. Cook.

Recovering the state of xorshift128

2026-05-15 20:34:29

I’ve written a couple posts lately about reverse engineering the internal state of a random number generator, first Mersenne Twister then lehmer64. This post will look at xorshift128, implemented below.

import random

# Seed the generator state
a: int = random.getrandbits(32)
b: int = random.getrandbits(32)
c: int = random.getrandbits(32)
d: int = random.getrandbits(32)

MASK = 0xFFFFFFFF

def xorshift128() -> int:
    global a, b, c, d

    t = d
    s = a

    t ^= (t << 11) & MASK t ^= (t >>  8) & MASK
    s ^= (s >> 19) & MASK

    a, b, c, d = (t ^ s) & MASK, a, b, c

    return a

Recovering state

Recovering the internal state of the generator is simple: it’s the four latest outputs in reverse order. This is illustrated by the following chart.

This means that once we’ve seen four outputs, we can predict the rest of the outputs. The following code demonstrates this.

Let’s generate five random values.

out = [xorshift128() for _ in range(5)]

Running

print(hex(out[4]))

shows the output 0xc3f4795d.

If we reset the state of the generator using the first four outputs

d, c, b, a, _ = out
print(hex(xorshift128()))

we get the same result.

Good stats, bad security

Mersenne Twister and lehmer64 have good statistical properties, despite being predictable. The xorshift128 generator is even easier to predict, but it also has good statistical properties. These generators would be fine for many applications, such as Monte Carlo simulation, but disastrous for use in cryptography.

The post on lehmer64 mentioned at the end that the internal state of PCG64 can also be recovered from its output. However, doing so requires far more sophisticated math and thousands of hours of compute time. Still, it’s not adequate for cryptography. For that you’d need a random number generator designed to be secure, such as ChaCha.

So why not just use a cryptographically secure random number generator (CSPRNG) for everything? You could, but the other generators mentioned in this post use less memory and are much faster. PCG64 occupies an interesting middle ground: simple and fast, but not easily reversible.

The post Recovering the state of xorshift128 first appeared on John D. Cook.

Initialize and print 128-bit integers in C

2026-05-12 20:20:20

If you look very closely at my previous post, you’ll notice that I initialize a 128-bit integer with a 64-bit value. The 128-bit unsigned integer represents the internal state of a random number generator. Why not initialize it to a 128-bit value? I was trying to keep the code simple.

A surprising feature of C compilers, at least of GCC and Clang, is that you cannot initialize a 128-bit integer to a 128-bit integer literal. You can’t directly print a 128-bit integer either, which is why the previous post introduces a function print_u128.

The code

__uint128_t x = 0x00112233445566778899aabbccddeeff;

Produces the following error message.

error: integer literal is too large to be represented in any integer type

The problem isn’t initializing a 128-bit number to a 128-bit value; the problem is that the compiler cannot parse the literal expression

0x00112233445566778899aabbccddeeff

One solution to the problem is to introduce the macro

#define U128(hi, lo) (((__uint128_t)(hi) << 64) | (lo))

and use it to initialize the variable.

__uint128_t x = U128(0x0011223344556677, 0x8899aabbccddeeff);

You can verify that x has the intended state by calling print_u128 from the previous post.

void print_u128(__uint128_t n)
{
    printf("0x%016lx%016lx\n",
           (uint64_t)(n >> 64),      // upper 64 bits
           (uint64_t)n);             // lower 64 bits
}

Then

print_u128(x);

prints

0x00112233445566778899aabbccddeeff

Update. The code for print_u128 above compiles cleanly with gcc but clang gives the following warning.

warning: format specifies type 'unsigned long' but the argument has type 'uint64_t' (aka 'unsigned long long') [-Wformat]

You can suppress the warning by including the inttypes header and modifying the print_u128 function.

Here’s the final code. It compiles cleanly under gcc and clang.

#include <stdio.h>
#include <stdint.h>
#include <inttypes.h>
#define U128(hi, lo) (((__uint128_t)(hi) << 64) | (lo))

void print_u128(__uint128_t n)
{
    printf("0x%016" PRIx64 "%016" PRIx64 "\n",
           (uint64_t)(n >> 64),
           (uint64_t)n);
}

int main(void)
{
    __uint128_t x = U128(0x0011223344556677, 0x8899aabbccddeeff);
    print_u128(x);
    return 0;
}

The post Initialize and print 128-bit integers in C first appeared on John D. Cook.

Hacking the lehmer64 RNG

2026-05-12 19:07:31

A couple days ago I wrote about hacking the Mersenne Twister. I explained how to recover the random number generator’s internal state from a stream of 640 outputs.

This post will do something similar with the lehmer64 random number generator. This generator is very simple to implement. Daniel Lemire found it to be “the fastest conventional random number generator that can pass Big Crush,” a well-respected test for pseudorandom number generators.

Implementing lehmer64

The lehmer64 generator can be implemented in C by

__uint128_t g_lehmer64_state;

uint64_t lehmer64() {
    g_lehmer64_state *= 0xda942042e4dd58b5ULL;  
  return g_lehmer64_state >> 64;
}

The analogous code in Python would have to simulate the overflow behavior of a 128-bit integer by reducing the state mod 2¹²⁸ after the multiplication.

Reverse engineering lehmer64 is easier than reverse engineering the Mersenne Twister because only three outputs are needed. However, the theory behind the exploit is more sophisticated. See [1].

The following code sets the state to an arbitrary initial seed value and generates three values.

#include <stdio.h>
#include <stdint.h>

int main(void)
{
    g_lehmer64_state = 0x4789499d78770934; // seed
    for (int i = 0; i < 3; i++) {
        printf("0x%016lx\n", lehmer64());
    }

    return 0;
}

The code prints the following.

0x3d144d12822bcc2e
0x85a67226191a568d
0x53e803dffc88e8f8

Exploiting lehmer64

Here is Python code for recovering the state of the lehmer64 generator given in [1].

def reconstruct(X):
    a = 0xda942042e4dd58b5
    r = round(2.64929081169728e-7 * X[0] + 3.51729342107376e-7 * X[1] + 3.89110109147656e-8 * X[2])
    s = round(3.12752538137199e-7 * X[0] - 1.00664345453760e-7 * X[1] - 2.16685184476959e-7 * X[2])
    t = round(3.54263598631140e-8 * X[0] - 2.05535734808162e-7 * X[1] + 2.73269247090513e-7 * X[2])
    u = r * 1556524 + s * 2249380 + t * 1561981
    v = r * 8429177212358078682 + s * 4111469003616164778 + t * 3562247178301810180
    state = (a*u + v) % (2**128)
    return state

Let’s call reconstruct with the output of our C code.

X = [0x3d144d12822bcc2e, 0x85a67226191a568d, 0x53e803dffc88e8f8]
print( hex( reconstruct(X) ) )

This prints

0x3d144d12822bcc2e1b81101c593761c4

Now for the confusing part: at what point is the number above the state of the generator? Is it the state before or after generating the three values? Neither! It is the state after generating the first value.

We can verify this by modifying the C code as follows and rerunning it.

void print_u128(__uint128_t n)
{
    printf("0x%016lx%016lx\n",
           (uint64_t)(n >> 64),      // upper 64 bits
           (uint64_t)n);             // lower 64 bits
}

int main(void)
{
    g_lehmer64_state = 0x4789499d78770934; // seed
    for (int i = 0; i 
The main goal of [1] is to recover the state of the PCG generator, not the lehmer64 generator. The latter was a side quest. Recovering the state of PCG64 is much harder; the authors estimate it takes about 20,000 CPU-hours. The paper shows that a technique used as part of pursuing their main goal can quickly recover the lehmer64 state.
Related posts

[1] Charles Bouillaguet, Florette Martinez, and Julia Sauvage. Practical seed-recovery for the PCG Pseudo-Random Number Generator. IACR Transactions on Symmetric Cryptology. ISSN 2519-173X, Vol. 2020, No. 3, pp. 175–196.

The post Hacking the lehmer64 RNG first appeared on John D. Cook.

Euler function

2026-05-12 08:49:41

This morning I wrote a post about the probability that a random matrix over a finite field is invertible. If the field has q elements and the matrix has dimensions n × n then the probability is

$p(q, n) = \prod_{i=1}^n \left(1 - \frac{1}{q^i}\right)$

In that post I made observation that p(q, n) converges very quickly as a function of n [1]. One way to see that the convergence is quick is to note that

$\prod_{i=1}^\infty \left(1 - \frac{1}{q^i}\right) = \prod_{i=1}^n \left(1 - \frac{1}{q^i}\right) \, \prod_{i=n+1}^\infty \left(1 - \frac{1}{q^i}\right)$

and

$\prod_{i=n+1}^\infty \left(1 - \frac{1}{q^i}\right) = 1 - {\cal O}\left(\frac{1}{q^{n+1}}\right)$

John Baez pointed out in the comments that p(q, ∞) = φ(1/q) where φ is the Euler function.

Euler was extremely prolific, and many things are named after him. Several functions are known as Euler’s function, the most common being his totient function in number theory. The Euler function we’re interested in here is

$\phi(x) = \prod_{i=1}^\infty \left( 1 - x^i \right)$

for −1 < x < 1. Usually the argument of φ is denoted “q” but that would be confusing in our context because our q, the number of elements in a field, is the reciprocal of Euler’s q, i.e. x = 1/q.

Euler’s identity [2] (in this context, not to be confused with other Euler identities!) says

$\phi(x) = \sum_{n=-\infty}^\infty (-1)^n x^{(3n^2 - n)/2}$

This function is easy to calculate because the series converges very quickly. From the alternating series theorem we have

$\phi(x) = \sum_{n=-N}^N (-1)^n (-1)^n x^{(3n^2 - n)/2} + {\cal O}\left( x^{(3(N+1)^2 - (N+1))/2} \right)$

When q = 2 and so x = 1/2, N = 6 is enough to compute φ(x) with an error less than 2⁻⁷⁰, beyond the precision of a floating point number. When q is larger, even fewer terms are needed.

To illustrate this, we have the following Python script.

def phi(x, N):
    s = 0
    for n in range(-N, N+1):
        s += (-1)**n * x**((3*n**2 - n)/2)
    return s

print(phi(0.5, 6))

Every digit in the output is correct.

[1] I didn’t say that explicitly, but I pointed out that p(2, 8) was close to p(2, ∞).

[2] This identity is also known as the pentagonal number theorem because of its connection to pentagonal numbers.

The post Euler function first appeared on John D. Cook.

Inverse shift

2026-05-11 23:30:30

What is the inverse of shifting a sequence to the right? Shifting it to the left, obviously.

But wait a minute. Suppose you have a sequence of eight bits

abcdefgh

and you shift it to the right. You get

0abcdefg.

If you shift this sequence to the left you get

abcdefg0

You can’t recover the last element h because the right-shift destroyed information about h.

A left-shift doesn’t fully recover a right-shift, and yet surely left shift and right shift are in some sense inverses.

Yesterday I wrote a post about representing bit manipulations, including shifts, as matrix operators. The matrix corresponding to shifting right by k bits has 1s on the kth diagonal above the main diagonal and 0s everywhere else. For example, here is the matrix for shifting an 8-bit number right two bits. A black square represents a 1 and a white square represents a 0.

This matrix isn’t invertible. When you’d like to take the inverse of a non-invertible matrix, your kneejerk response should be to compute the pseudoinverse. (Technically the Moore-Penrose pseudoinverse. There are other pseudoinverses, but Moore-Penrose is the most common.)

As you might hope/expect, the pseudoinverse of a right-shift matrix is a left-shift matrix. In this case the pseudoinverse is simply the transpose, though of course that isn’t always the case.

If you’d like to prove that the pseudoinverse of a matrix that shifts right by k places is a matrix that shifts left by k places, you don’t have to compute the pseudo inverse per se: you can verify your guess. This post gives four requirements for a pseudoinverse. You can prove that left shift is the inverse of right shift by showing that it satisfies the four equations.

The post Inverse shift first appeared on John D. Cook.

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Examples

Applying Osborn’s rule

Slug it out

Related posts

Recovering state

Good stats, bad security

Implementing lehmer64

Exploiting lehmer64

Related posts

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John D. Cook Modify