I’ve written a couple times about Fibonacci numbers and certificates. Here the certificate is auxiliary data that makes it faster to confirm that the original calculation was correct.

This post puts some timing numbers to this.

I calculated the 10 millionth Fibonacci number using code from this post.

n = 10_000_000    
F = fib_mpmath(n)

This took 150.3 seconds.

As I’ve discussed before, a number f is a Fibonacci number if and only if 5f² ± 4 is a square r². And for the nth Fibonacci number, we can take ± to be positive if n is even and negative if n is odd.

I computed the certificate r with

r = isqrt(5*F**2 + 4 - 8*(n%2))

and this took 65.2 seconds.

Verifying that F is correct with

n = abs(5*F**2 - r**2)
assert(n == 4)

took 3.3 seconds.

About certificates

So in total it took 68.5 seconds to verify that F was correct. But if someone had pre-computed r and handed me F and r I could use r to verify the correctness of F in 3.3 seconds, about 2% of the time it took to compute F.

Sometimes you can get a certificate of correctness for free because it is a byproduct of the problem you’re solving. Other times computing the certificate takes a substantial amount of work. Here computing F and r took about 40% more work than just computing F.

What’s not typical about this example is that the solution provider carries out exactly the same process to create the certificate that someone receiving the solution without a certificate would do. Typically, even if the certificate isn’t free, it does come at a “discount,” i.e. the problem solver could compute the certificate more efficiently than someone given only the solution.

Proving you have the right Fibonacci number

Now suppose I have you the number F above and claim that it is the 10,000,000th Fibonacci number. You carry out the calculations above and say “OK, you’ve convinced me that F is a Fibonacci number, but how do I know it’s the 10,000,000th Fibonacci number?

The 10,000,000th Fibonacci number has 2,089,877 digits. That’s almost enough information to verify that a Fibonacci number is indeed the 10,000,000th Fibonacci number. The log base 10 of the nth Fibonacci number is very nearly

n log₁₀ φ − 0.5 log₁₀ 5

based on Binet’s formula. From this we can determine that the nth Fibonacci number has 2,089,877 digits if n = 10,000,000 + k where k equals 0, 1, 2, or 3.

Because

log₁₀ F_10,000,000 = 2089876.053014785

and

10^0.053014785 = 1.129834377783962

we know that the first few digits of F_10,000,000 are 11298…. If I give you a 2,089,877 digits that you can prove to be a Fibonacci number, and its first digit is 1, then you know it’s the 10,000,000th Fibonacci number.

You could also verify the number by looking at the last digit. As I wrote about here, the last digits of Fibonacci number have a period of 60. That means the last digit of the 10,000,000th Fibonacci number is the same as the last digit of the 40th Fibonacci number, which is 5. That is enough to rule out the other three possible Fibonacci numbers with 2,089,877 digits.

I’ve written before about computing big Fibonacci numbers, and about creating a certificate to verify a Fibonacci number has been calculated correctly. This post will revisit both, giving a different approach to computing big Fibonacci numbers that produces a certificate along the way.

As I’ve said before, I’m not aware of any practical reason to compute large Fibonacci numbers. However, the process illustrates techniques that are practical for other problems.

The fastest way to compute the nth Fibonacci number for sufficiently large n is Binet’s formula:

F_n = round( φⁿ / √5 )

where φ is the golden ratio. The point where n is “sufficiently large” depends on your hardware and software, but in my experience I found the crossover to be somewhere 1,000 and 10,000.

The problem with Binet’s formula is that it requires extended precision floating point math. You need extra guard digits to make sure the integer part of your result is entirely correct. How many guard digits you’ll need isn’t obvious a priori. This post gave a way of detecting errors, and it could be turned into a method for correcting errors.

But how do we know an error didn’t slip by undetected? This question brings us back to the idea of certifying a Fibonacci number. A number f Fibonacci number if and only if one of 5f² ± 4 is a perfect square.

Binet’s formula, implemented in finite precision, takes a positive integer n and gives us a number f that is approximately the nth Fibonacci number. Even in low-precision arithmetic, the relative error in the computation is small. And because the ratio of consecutive Fibonacci numbers is approximately φ, an approximation to F_n is far from the Fibonacci numbers F_{n − 1} and F_{n + 1}. So the closest Fibonacci number to an approximation of F_n is exactly F_n.

Now if f is approximately F_n, then 5f² is approximately a square. Find the integer r minimizing  |5f² − r²|. In Python you could do this with the isqrt function. Then either r² + 4 or r² − 4 is divisible by 5. You can know which one by looking at r² mod 5. Whichever one is, divide it by 5 and you have the square of F_n. You can take the square root exactly, in integer arithmetic, and you have F_n. Furthermore, the number r that you computed along the way is the certificate of the calculation of F_n.

The previous post discussed two ways to compute the nth Fibonacci number. The first is to compute all the Fibonacci numbers up to the nth iteratively using the defining property of Fibonacci numbers

F_{n + 2} = F_n + F_{n + 1}

with extended integer arithmetic.

The second approach is to use Binet’s formula

F_n = round( φⁿ / √ 5 )

where φ is the golden ratio.

It’s not clear which approach is more efficient. You might naively say that the iterative approach has run time O(n) while Binet’s formula is O(1). That doesn’t take into account how much work goes into each step, but it does suggest that eventually Binet wins.

The relative efficiency of each algorithm depends on how it is implemented. In this post I will compare using Python’s integer arithmetic and the mpmath library for floating point. Here’s my code for both methods.

from math import log10
import mpmath as mp

def fib_iterate(n):
    a, b = 0, 1
    for _ in range(n):
        a, b = b, a + b
    return a

def digits_needed(n):

    phi = (1 + 5**0.5) / 2
    return int(n*log10(phi) - 0.5*log10(5)) + 1

def fib_mpmath(n, guard_digits=30):

    digits = digits_needed(n)

    # Set decimal digits of precision
    mp.mp.dps = digits + guard_digits

    sqrt5 = mp.sqrt(5)
    phi = (1 + sqrt5) / 2
    x = (phi ** n) / sqrt5

    return int(mp.nint(x))

Next, here’s some code to compare the run times.

def compare(n):
    
    start = time.perf_counter()
    x = fib_iterate(n)
    elapsed = time.perf_counter() - start
    print(elapsed)

    start = time.perf_counter()
    y = fib_mpmath(n)
    elapsed = time.perf_counter() - start
    print(elapsed)

    if (x != y):
        print("Methods produced different results.")

This code shows that the iterate approach is faster for n = 1,000 but Binet’s method is faster for n = 10,000.

>>> compare(1_000)
0.0002502090001144097
0.0009207079999669077
>>> compare(10_000)
0.0036547919999065925
0.002145750000181579

For larger n, the efficiency advantage of Binet’s formula becomes more apparent.

>>> compare(1_000_000)
11.169050417000108
2.0719056249999994

Guard digits and correctness

There is one unsettling problem with the function fib_mpmath above: how many guard digits do you need? To compute a number correctly to 100 significant figures, for example, requires more than 100 digits of working precision. How many more? It depends on the calculation. What about our calculation?

If we compute the 10,000th Fibonacci number using fib_mpmath(10_000, 2), i.e. with 2 guard digits, we get a result that is incorrect in the last digit. To compute the 1,000,000th Fibonacci number correctly, we need 5 guard digits.

We don’t need many guard digits, but we’re guessing at how many we need. How might we test whether we’ve guessed correctly? One way would be to compute the result using fib_iterate and compare results, but that defeats the purpose of using the more efficient fib_mpmath.

If floating point calculations produce an incorrect result, the error is likely to be in the least significant digits. If we knew that the last digit was correct, that would give us more confidence that all the digits are correct. More generally, we could test the result mod m. I discussed Fibonacci numbers mod m in this post.

When m = 10, the last digits of the Fibonacci numbers have a cycle of 60. So the Fibonacci numbers with index n and with index n mod 60 should be the same.

The post I just mentioned links to a paper by Niederreiter that says the Fibonacci numbers ore evenly distributed mod m if and only if m is a power of 5, in which case the cycle length is 4m.

The following code could be used as a sanity check on the result of fig_mpmath.

def mod_check(n, Fn):
    k = 3
    base = 5**k
    period = 4*base
    return Fn % base == fib_iterate(n % period) % base

With k = 3, we are checking the result of our calculation mod 125. It is unlikely that an incorrect result would be correct mod 125. It’s hard to say just how unlikely. Naively we could say there’s 1 chance in 125, but that ignores the fact that the errors are most likely in the least significant bits. The chances of an incorrect result being correct mod 125 would be much less than 1 in 125. For more assurance you could use a larger power of 5.