# How many ways are there to describe the Fibonacci sequence in Perl 6?

I've been looking at the various ways of constructing lazy lists in Perl 6 and I would like to collect all of the concise ways of describing the Fibonacci sequence.

I will start this off with the three from masak's journal:

``````my @fibs := (0, 1, -> \$a, \$b { \$a + \$b } ... *);

my @fibs := (0, 1, { \$^a + \$^b } ... *);

my @fibs := (0, 1, *+* ... *);
``````

I was thinking something like this would also work, but I think I have the syntax wrong:

``````my @fibs := (0, 1, (@fibs Z+ @fibs[1..*]));
``````

Something there is eager (the slice?) and causes Rakudo to enter an infinite loop. It's a translation of the Haskell definition:

``````fibs = 0 : 1 : zipWith (+) fibs (tail fibs)
``````

Update:

Seems like the problem with the `zipWith` example is the `@fibs[1..*]` slice. if `tail` is defined as `sub tail (@x) {my \$i = 1; {@x[\$i++]}...*}` then it works properly. I would be interested to know why the slice isn't lazy from anyone familiar with Rakudo's internals.

Another nice one is:

``````my @fibs := (0, [\+] 1, @fibs);
``````
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This is one of the reasons I like Perl 6. :) –  brian d foy Oct 20 '10 at 22:13
Is the question about your bug, or about possible other solutions? Your code is missing a closing parenthesis, if Perl 6's syntax isn't stranger than I thought... –  Charles Stewart Oct 21 '10 at 8:18
Have you tried your code on Pugs? –  Charles Stewart Oct 21 '10 at 8:20
@Charles => Thanks for catching the paren, fixed. That was just a typo when I wrote the question. I would like to collect all of the different ways to write the sequence. I posted the zipWith solution as one that I think should be doable, but that I have not had success with. I have not tried to run these in Pugs. –  Eric Strom Oct 21 '10 at 15:47
More Than One (TM). –  aschepler Dec 8 '10 at 16:35

Some of the ways are here, this would also be a nice place to put the solutions you found to.

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The shortest seems to be

``````my @fibs := ^2,*+*...*;
``````
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You can use the magic of the golden ratio: let φ=(sqrt(5)+1)/2, and define fib(n)=(φn+(1-φ)n)/sqrt(5).

You can convert such a function into a lazy list in the obvious way: In Haskell the following works:

```fibs=genfibs 0 where genfibs n=(round (fib n)):genfibs (n+1)
```

I'm afraid my Perl 6 knowledge isn't up to translating this, sorry! Anyone who edits this answer to edit in the codes will earn my gratitude.

A more testing question would be to list ways of generating the lazy list of Hamming numbers.

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Sorry to be pedantic, but for clarification: the golder ratio is 0.5*(sqrt(5)+1) and the closed form of a fibonacci number is ((1+sqrt(5))^n - (1-sqrt(5))^n)/(2^n * sqrt(5)) = (φ^n-(1-φ)^n)/sqrt(5) [mathworld.wolfram.com/FibonacciNumber.html] –  PhilI Oct 22 '10 at 15:47
@Phil: Yes, I should have checked, at least that case n=0 worked. Far from a pedantic correction; many thanks. –  Charles Stewart Oct 23 '10 at 7:07