I want to get the 48th element of the Fibonacci sequence which I can store in a 64 bit integer. I am using a recursive subroutine, but it is taking forever to finish. If anyone can find a problem with my recursive subroutine, I would be very grateful.

Integer (Int8) :: n
Integer (Int64) :: fib64
n = Int (48, Int8)
Call fibonacci_genr (fib64, n) 

Here is my recursive subroutine

Recursive                  &
Subroutine fibonacci_genr  &
(                        &
  fb, n                  &

Integer (Int64), Intent (Out) :: fb
Integer (Int8), Intent (In) :: n

    Integer (Int64) :: fb1, fb2
    If (n < 2) Then 
      fb = Int (n, Int64) 
      Call fibonacci_genr (fb1, n-1)
      Call fibonacci_genr (fb2, n-2)
      fb = fb1 + fb2
    End If
End Subroutine fibonacci_genr
  • Have you worked out how many calls are needed to compute the 48th fibonacci number recursively? (Hint: a lot) – Scott Hunter May 23 '15 at 3:22
  • just put counter in your subroutine and count # of calls and print it - you'll be enlightened. – Severin Pappadeux May 23 '15 at 3:23
  • You could memorize your answers no need to look it up twice. – t3dodson May 23 '15 at 3:27
  • The number of calls is phenomenal – Zeus May 23 '15 at 4:20
up vote 1 down vote accepted

Appologies I don't know fortran I'll try my best to show you how to speed it up in javascript and my best at a fortran solution

var memo = [];
function fib(n) {
    if (memo[n-1]) { //check to see if you already calculated the answer
        return memo[n-1];
    memo[n-1] = n <= 1 ? 1 : fib(n - 1) + fib(n - 2);
    return memo[n-1];

Here is the memoized fortran

Integer (Int64) :: memo(48) = 0

Integer (Int64), Intent (Out) :: fb
Integer (Int8), Intent (In) :: n

Integer (Int64) :: fb1, fb2
If (memo(n) > 1) Then    ! if its in the array we just use that value
    fb = memo(n)
Else If (n <= 2) Then 
    memo(n) = Int (1, Int64) 
    fb = memo(n)
    Call fibonacci_genr (fb1, n-1)
    Call fibonacci_genr (fb2, n-2)
    memo(n) = fb1 + fb2
    fb = memo(n)
End If
End Subroutine fibonacci_genr
  • Does there exist a solution which does not need to store all the fibonacci numbers? – Zeus May 23 '15 at 3:53
  • @Zeus So this trades computation time for space. I'm pretty sure you need a way to "remember" the old values if you don't want to calculate them each time. If space is an issue you could adjust it to only remember every 10 fib numbers or so. Then it would calculate on average the last 5 fib numbers. – t3dodson May 23 '15 at 3:55
  • @Zeus if you can store the numbers this would be MUCH faster. – t3dodson May 23 '15 at 3:56
  • I found I can use the golden ratio – Zeus May 23 '15 at 4:10
  • 1
    @Zeus OH YEAH you can calculate fib numbers in constant space and time with a funny equation – t3dodson May 23 '15 at 4:11

Given that Int8=1 and Int64=8 and explicit interface, gfortran4.7.2 complains that

call fibonacci_genr( fb1, n-1 )
Error: Type mismatch in argument 'n' at (1); passed INTEGER(4) to INTEGER(1)

If the actual arguments are cast to Int8

Call fibonacci_genr (fb1, int( n-1, Int8 ) )

or Int8 literals are used directly (thanks to @francescalus)

Call fibonacci_genr (fb1, n - 1_Int8 )

the code seems to work fine. But I think it is much simpler to use integer :: n rather than integer(Int8) :: n because there is no overflow for n....

BTW I also measured the time for calling this routine for n = 0 to 48. It was 91 sec on Xeon2.6GHz(x86_64) + gfortran4.7.2 -O2. The time reduced to 72 sec if the subroutine is replaced by a function. For comparison, I also tried the following code in Julia

function fibo( n::Int )  # Int defaults to Int64
    if n <= 1
        return n
        return fibo( n-1 ) + fibo( n-2 )

for inp = 0:48
    println( fibo( inp ) )

took 118 sec and so pretty good for this recursion. On the other hand, direct iteration (without recursive calls) is of course superfast and takes only <0.001 sec.

  • You do not get the problem using Fortran-5. – Zeus May 23 '15 at 12:51
  • @Zeus What's Fortran-5? – roygvib May 23 '15 at 12:53
  • gfortran-5 is the latest version of gfortran – Zeus May 23 '15 at 12:58
  • Ah, okay. Unfortunately, I am still using gfortran-4 (up to 4.8.2). BTW I googled for Fortran-5 and immediately found this en.wikipedia.org/wiki/Fortran_5 Hmm.. – roygvib May 23 '15 at 13:04
  • In the Julia version, you can, I think, even leave out the ::Int declaration, since it's a type stable function; it runs in the same time as when you include it. – daycaster May 23 '15 at 14:38

This solution gives you a fibonacci digit in linear time (# of calls == fibonacci digit -2, and only 1 call for digits 1 and 2). This is accomplished by using a recursive function that returns two digits of the sequence so that each call can calculate the next digit and re-use the previous digit as its return values. This does require a wrapper function if you want to call it to receive only the new digit, but this is a small sacrifice for reduced recursion.

Here are the functions:

  integer(kind=int64) pure function fibonacci(n)
    use iso_fortran_env
    implicit none
    integer, intent(in) :: n
    integer(kind=int64), dimension(2) :: fibo

    fibo = fib(int(n,int64))
    fibonacci = fibo(1)
  end function fibonacci

  recursive pure function fib(n) result(ret)
    use iso_fortran_env
    implicit none
    integer(kind=int64), intent(in) :: n
    integer(kind=int64), dimension(2) :: tmp,ret

    if (n == 1_int64) then
       ret = [1_int64, 0_int64]
    else if (n == 2_int64) then
       ret = [1_int64, 1_int64]
       tmp = fib(n-1)
       ret = [sum(tmp), tmp(1)]
    end if
  end function fib

Using these functions the time to calculate fibonacci(48) is negligible.

Calculating Fibonacci recursively like this leads to repeated calculations Recursion vs. Iteration (Fibonacci sequence) . To avoid this, use an iterative algorithm.

  • It is what I am encountering – Zeus May 23 '15 at 3:43

This is written in Python (again no FORTRAN).

def f(a):
  if (a < 2):
    return a;
  return _f(a-2, 2, 1)

def _f(a, n1 , n2) :
  if(a==0) :
    return n1+n2
  return _f(a-1, n1+n2, n1)

Each number is only calculated once instead of multiple times. _f is a private function f is the one you call,

Note: this is still recursive but will only call itself 48 times (order N)

  • Have i missed something? What is wrong with my answer? I don't have enough rep to comment on other posts. But you don't need to cache all the values in a array, – pev.hall May 23 '15 at 4:11

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