Pollard's rho algorithm for logarithms

Pollard's rho algorithm for logarithms is an algorithm introduced by John Pollard in 1978 to solve the discrete logarithm problem, analogous to Pollard's rho algorithm to solve the integer factorization problem.

The goal is to compute $\gamma$ such that $\alpha ^{\gamma }=\beta$ , where $\beta$ belongs to a cyclic group $G$ generated by $\alpha$ . The algorithm computes integers $a$ , $b$ , $A$ , and $B$ such that $\alpha ^{a}\beta ^{b}=\alpha ^{A}\beta ^{B}$ . If the underlying group is cyclic of order $n$ , we can calculate $\gamma$ as a solution of the equation $(B-b)\gamma =(a-A){\pmod {n}}$ .

To find the needed $a$ , $b$ , $A$ , and $B$ the algorithm uses Floyd's cycle-finding algorithm to find a cycle in the sequence $x_{i}=\alpha ^{{a_{i}}}\beta ^{{b_{i}}}$ , where the function $f:x_{i}\mapsto x_{{i+1}}$ is assumed to be random-looking and thus is likely to enter into a loop after approximately ${\sqrt {{\frac {\pi n}{2}}}}$ steps. One way to define such a function is to use the following rules: Divide $G$ into three disjoint subsets of approximately equal size: $S_{0}$ , $S_{1}$ , and $S_{2}$ . If $x_{i}$ is in $S_{0}$ then double both $a$ and $b$ ; if $x_{i}\in S_{1}$ then increment $a$ , if $x_{i}\in S_{2}$ then increment $b$ .

Algorithm

Let $G$ be a cyclic group of order $p$ , and given $\alpha ,\beta \in G$ , and a partition $G=S_{0}\cup S_{1}\cup S_{2}$ , let $f:G\to G$ be a map

f(x)={\begin{cases}\beta x&x\in S_{0}\\x^{2}&x\in S_{1}\\\alpha x&x\in S_{2}\end{cases}}

and define maps $g:G\times {\mathbb {Z}}\to {\mathbb {Z}}$ and $h:G\times {\mathbb {Z}}\to {\mathbb {Z}}$ by

{\begin{aligned}g(x,n)&={\begin{cases}n&x\in S_{0}\\2n\ ({\bmod {\ }}p)&x\in S_{1}\\n+1\ ({\bmod {\ }}p)&x\in S_{2}\end{cases}}\\h(x,n)&={\begin{cases}n+1\ ({\bmod {\ }}p)&x\in S_{0}\\2n\ ({\bmod {\ }}p)&x\in S_{1}\\n&x\in S_{2}\end{cases}}\end{aligned}}

 Inputs a: a generator of G, b: an element of G
 Output An integer x such that a^x = b, or failure

 Initialise a₀ ← 0, b₀ ← 0, x₀ ← 1 ∈ G, 

 i ← 1
 loop
     x_i ← f(x_i-1), 
     a_i ← g(x_i-1, a_i-1), 
     b_i ← h(x_i-1, b_i-1)

     x_2i ← f(f(x_2i-2)), 
     a_2i ← g(f(x_2i-2), g(x_2i-2, a_2i-2)), 
     b_2i ← h(f(x_2i-2), h(x_2i-2, b_2i-2))

     if x_i = x_2i then
         r ← b_i - b_2i
         if r = 0 return failure
         x ← r⁻¹(a_2i - a_i) mod p
         return x
     else # x_i ≠ x_2i
         i ← i+1, 
         break loop
     end if
  end loop

Example

Consider, for example, the group generated by 2 modulo $N=1019$ (the order of the group is $n=1018$ , 2 generates the group of units modulo 1019). The algorithm is implemented by the following C++ program:

 #include <stdio.h>
 
 const int n = 1018, N = n + 1;  /* N = 1019 -- prime     */
 const int alpha = 2;            /* generator             */
 const int beta = 5;             /* 2^{10} = 1024 = 5 (N) */
 
 void new_xab( int& x, int& a, int& b ) {
   switch( x%3 ) {
   case 0: x = x*x     % N;  a =  a*2  % n;  b =  b*2  % n;  break;
   case 1: x = x*alpha % N;  a = (a+1) % n;                  break;
   case 2: x = x*beta  % N;                  b = (b+1) % n;  break;
   }
 }
 
 int main(void) {
   int x=1, a=0, b=0;
   int X=x, A=a, B=b;
   for(int i = 1; i < n; ++i ) {
     new_xab( x, a, b );
     new_xab( X, A, B );
     new_xab( X, A, B );
     printf( "%3d  %4d %3d %3d  %4d %3d %3d\n", i, x, a, b, X, A, B );
     if( x == X ) break;
   }
   return 0;
 }

The results are as follows (edited):

 i     x   a   b     X   A   B
------------------------------
 1     2   1   0    10   1   1
 2    10   1   1   100   2   2
 3    20   2   1  1000   3   3
 4   100   2   2   425   8   6
 5   200   3   2   436  16  14
 6  1000   3   3   284  17  15
 7   981   4   3   986  17  17
 8   425   8   6   194  17  19
..............................
48   224 680 376    86 299 412
49   101 680 377   860 300 413
50   505 680 378   101 300 415
51  1010 681 378  1010 301 416

That is $2^{{681}}5^{{378}}=1010=2^{{301}}5^{{416}}{\pmod {1019}}$ and so $(416-378)\gamma =681-301{\pmod {1018}}$ , for which $\gamma _{1}=10$ is a solution as expected. As $n=1018$ is not prime, there is another solution $\gamma _{2}=519$ , for which $2^{{519}}=1014=-5{\pmod {1019}}$ holds.

Complexity

The running time is approximately ${\mathcal {O}}({\sqrt {n}})$ . If used together with the Pohlig-Hellman algorithm, the running time of the combined algorithm is ${\mathcal {O}}({\sqrt {p}})$ , where $p$ is the largest prime factor of $n$ .

References

Pollard, J. M. (1978). "Monte Carlo methods for index computation (mod p)". Mathematics of Computation. 32 (143): 918–924. doi:10.2307/2006496.
Menezes, Alfred J.; van Oorschot, Paul C.; Vanstone, Scott A. (2001). "Chapter 3" (PDF). Handbook of Applied Cryptography.

Number-theoretic algorithms

Primality tests	AKS test APR test Baillie–PSW Elliptic curve Pocklington Fermat Lucas Lucas–Lehmer Lucas–Lehmer–Riesel Proth's theorem Pépin's Quadratic Frobenius test Solovay–Strassen Miller–Rabin

Prime-generating	Sieve of Atkin Sieve of Eratosthenes Sieve of Sundaram Wheel factorization

Integer factorization	Continued fraction (CFRAC) Dixon's Lenstra elliptic curve (ECM) Euler's Pollard's rho p − 1 p + 1 Quadratic sieve (QS) General number field sieve (GNFS) Special number field sieve (SNFS) Rational sieve Fermat's Shanks' square forms Trial division Shor's

Multiplication	Ancient Egyptian Long Karatsuba Toom–Cook Schönhage–Strassen Fürer's

Discrete logarithm	Baby-step giant-step Pollard rho Pollard kangaroo Pohlig–Hellman Index calculus Function field sieve

Greatest common divisor	Binary Euclidean Extended Euclidean Lehmer's

Modular square root	Cipolla Pocklington's Tonelli–Shanks

Other algorithms	Chakravala Cornacchia LLL Integer square root Modular exponentiation Schoof's

Italics indicate that algorithm is for numbers of special forms

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