# Fast Fibonacci recursion

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I'm trying to recall an algorithm on Fibonacci recursion. The following:

public int fibonacci(int n)  {
if(n == 0)
return 0;
else if(n == 1)
return 1;
else
return fibonacci(n - 1) + fibonacci(n - 2);
}

is not what I'm looking for because it's greedy. This will grow exponentially (just look at Java recursive Fibonacci sequence - the bigger the initial argument the more useless calls will be made).

There is probably something like a "cyclic argument shift", where calling previous Fibonacci value will retrieve value instead of calculating it again.

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maybe like this:

int fib(int term, int val = 1, int prev = 0)
{
if(term == 0) return prev;
if(term == 1) return val;
return fib(term - 1, val+prev, val);
}

this function is tail recursive. this means it could be optimized and executed very efficiently. In fact, it gets optimized into a simple loop..

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This was exactly what I was looking for. I didn't know that it's called "tail recursion" in English. Great thanks, mate! – tkoomzaaskz Dec 11 '12 at 20:34
Or you could just implement it as a loop in the first place, doh! – Tyler Durden Dec 11 '12 at 20:46
@TylerDurden: the question is about fast recursion. – duedl0r Dec 12 '12 at 8:26

This kind of problems are linear recurrence types and they are solved fastest via fast matrix exponentiation. Here's the blogpost that describes this kind of approach concisely.

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Say you want to have the the n'th fib number then build an array containing the preceeding numbers

int a[n];
a[0] = 0;
a[1] =1;
a[i] = n[i-1]+n[n-2];
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 There is a solution without storing values in an array. If you call f(n), each numbers (n, n-1, n-2, ..., 1, 0) will be calculated exactly once. – tkoomzaaskz Dec 11 '12 at 19:14

You can do a pretty fast version of recursive Fibonacci by using memoization (meaning: storing previous results to avoid recalculating them). for example, here's a proof of concept in Python, where a dictionary is used for saving previous results:

results = { 0:0, 1:1 }

def memofib(n):
if n not in results:
results[n] = memofib(n-1) + memofib(n-2)
return results[n]

It returns quickly for input values that would normally block the "normal" recursive version. Just bear in mind that an int data type won't be enough for holding large results, and using arbitrary precision integers is recommended.

A different option altogether - rewriting this iterative version ...

def iterfib(n):
a, b = 0, 1
for i in xrange(n):
a, b = b, a + b
return a

... as a tail-recursive function, called loop in my code:

def tailfib(n):
return loop(n, 0, 1)

def loop(i, a, b):
if i == 0:
return a
return loop(i-1, b, a+b)
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 @tkoomzaaskz I updated my answer with another possible solution, FYI. – Óscar López Dec 11 '12 at 20:50