I have to compute efficiently a^^b mod m for large values of a,b,m<2^32
where ^^ is the tetration operator: 2^^4=2^(2^(2^2))

m is not a prime number and not a power of ten.

Can you help?

  • Which language? What did you try? Jun 8 '15 at 15:48
  • You can try implementing it in python, but don't forget to use the modular property (a mod n) (b mod n) == ab mod n since this will reduce some of your work, taking worst case a = b = m = 2^32 - 1, the final result will take much time and memory to run. Jun 8 '15 at 16:00
  • 3
    @PhamTrung This isn't a duplicate, since this talks about tetration rather than exponentiation. Jun 8 '15 at 16:18
  • @Thomas I use C++ but a solution in python is welcome. I have tried: Jun 8 '15 at 16:34

To be clear, a^^b is not the same thing as a^b, it is the exponential tower a^(a^(a^...^a)) where there are b copies of a, also known as tetration. Let T(a,b) = a^^b so T(a,1) = a and T(a,b) = a^T(a,b-1).

To compute T(a,b) mod m = a^T(a,b-1) mod m, we want to compute a power of a mod m with an extremely large exponent. What you can use is that modular exponentiation is preperiodic with preperiod length at most the greatest power of a prime in the prime factorization of m, which is at most log_2 m, and the period length divides phi(m), where phi(m) is Euler's totient function. In fact, the period length divides Carmichael's function of m, lambda(m). So,

a^k mod m = a^(k+phi(m)) mod m as long as k>log_2 m.

Be careful that a is not necessarily relatively prime to m (or later, to phi(m), phi(phi(m)), etc.). If it were, you could say that a^k mod m = a^(k mod phi(m)) mod m. However, this is not always true when a and m are not relatively prime. For example, phi(100) = 40, and 2^1 mod 100 = 2, but 2^41 mod 100 = 52. You can reduce large exponents to congruent numbers mod phi(m) that are at least log_2 m, so you can say that 2^10001 mod 100 = 2^41 mod 100 but you can't reduce that to 2^1 mod 100. You could define a mod m [minimum x] or use min + mod(a-min,m) as long as a>min.

If T(a,b-1) > [log_2 m], then

a^T(a,b-1) mod m = a^(T(a,b-1) mod phi(m) [minimum [log_2 m]])

otherwise just calculate a^T(a,b-1) mod m.

Recursively calculate this. You can replace phi(m) with lambda(m).

It doesn't take very long to compute the prime factorization of a number under 2^32 since you can determine the prime factors in at most 2^16 = 65,536 trial divisions. Number-theoretic function like phi and lambda are easily expressed in terms of the prime factorization.

At each step, you will need to be able to calculate modular powers with small exponents.

You end up calculating powers mod phi(m), then powers mod phi(phi(m)), then powers mod phi(phi(phi(m))), etc. It doesn't take that many iterations before the iterated phi function is 1, which means you reduce everything to 0, and you no longer get any change by increasing the height of the tower.

Here is an example, of a type that is included in high school math competitions where the competitors are supposed to rediscover this and execute it by hand. What are the last two digits of 14^^2016?

14^^2016 mod 100 
= 14^T(14,2015) mod 100
= 14^(T(14,2015) mod lambda(100) [minimum 6]) mod 100
= 14^(T(14,2015 mod 20 [minimum 6]) mod 100

T(14,2015) mod 20 
= 14^T(14,2014) mod 20
= 14^(T(14,2014) mod 4 [minimum 4]) mod 20

T(14,2014) mod 4
= 14^T(14,2013) mod 4
= 14^(T(14,2013 mod 2 [minimum 2]) mod 4

T(14,2013) mod 2
= 14^T(14,2012) mod 2
= 14^(T(14,2012 mod 1 [minimum 1]) mod 2
= 14^(1) mod 2
= 14 mod 2
= 0

T(14,2014) mod 4 
= 14^(0 mod 2 [minimum 2]) mod 4
= 14^2 mod 4
= 0

T(14,2015) mod 20
= 14^(0 mod 4 [minimum 4]) mod 20 
= 14^4 mod 20
= 16

T(14,2016) mod 100
= 14^(16 mod 20 [minimum 6]) mod 100
= 14^16 mod 100
= 36

So, 14^14^14^...^14 ends in the digits ...36.

  • 1
    Can you give the recursive algorithm part in pseudo-code with all the stop conditions of the recursion and taking into account of the case when a and m are not relatively prime. Jun 11 '15 at 11:12
  • @bilbo: The reason I used x mod y [min k] instead of x mod y was that my answer handles the case that a is not relatively prime to m, or to phi(m). I never assumed that a was relatively prime to m. The lines "If T(a,b-1) > [log_2 m], then a^T(a,b-1) mod m = a^(T(a,b-1) mod phi(m) [minimum [log_2 m]]) otherwise just calculate a^T(a,b-1) mod m." describe the algorithm. Jun 12 '15 at 3:56
  • I don't see how to compute T(a,b-1) without overflow to test T(a,b-1) > [log_2 m]. The recursive function I compute is T1(a,b,totient(m),log_2(m)) but I don't see how to include the test T(a,b-1) > [log_2 m] Jun 12 '15 at 12:02
  • If b>=1, then T(a,b) >= a. If that doesn't let you compare T(a,b) with log_2 m, then take the log base a of both sides, so you compare T(a,b-1) with log_a(log_2 m). Apply this recursively. Jun 12 '15 at 17:57
  • @DouglasZare could you please explain this sentence "a mod m [minimum x] or use min + mod(a-min,m) as long as a>min". I tried to implement this algorithm using Eulers totient, and in most of my test cases it succed but not all and particularly your example fails as well, but as I don't have an implementation of carmichael lambda function it's hard to compare results. Dec 12 '18 at 15:25

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