Fibonacci numbers with initial two values as parameters

I have been trying to make a infinite fibonacci list producing function that can take first 2 values as parameters.

Without specifying the first two values it is possible like this

``````fib = 1 : 1 : zipWith (+) fib (tail fib)
``````

Suppose I wanted to start the fibonacci sequence with 5 and 6 instead of 1,1 or 0,1 then I will have to change the above code. But when trying to make a lazy list generator in which I can specify the first 2 values of fibonacci sequence I am stumped. I came up with this but that didn't work.

``````fib a b = a : b : zipWith (+) fib (tail fib)
``````

The problem is obvious. I am trying to convert the use of list in the hard-coded one. How can I solve that?

-
well... you still could `zipWith (+) (fib a b) (tail \$ fib a b)`, even though that's of course is inefficient –  Sassa NF Feb 15 '14 at 12:02

``````fib a b = fibs where fibs = a : b : zipWith (+) fibs (tail fibs)
``````

? Use the same method, but with your parameters in scope.

I should add that, in case you are tempted by

``````fib a b = a : b : zipWith (+) (fib a b) (tail (fib a b))  -- worth trying?
``````

the `where fibs` version ensures that only one infinite stream is generated. The latter risks generating a fresh stream for each recursive invocation of `fib`. The compiler might be clever enough to spot the common subexpression, but it is not wise to rely on such luck. Try both versions in `ghci` and see how long it takes to compute the 1000th element.

-
I used `takeWhile (< 1000000) \$ (fib 1 2)` for both the versions. Didn't time it. The difference was apparent without any timing necessary. First one was much faster compared to the second one. –  Aseem Bansal Feb 14 '14 at 16:46
note that "the" Fibonacci numbers should always be `[0,1,1,2,...]` because this gives nice properties like `gcd (fib !! x)(fib !! y) = fib !! gcd x y` –  d8d0d65b3f7cf42 Feb 14 '14 at 18:15

The simplest way to do that is:

``````fib a b = a: fib b (a+b)
``````

This stems from the inductive definition of the Fibonacci series: suppose we have a function that can produce a stream of Fibonacci numbers from Fi onwards, given Fi and Fi+1. What could that function look like? Well, Fi is given, and the rest of the stream can be computed using this function to produce a stream of Fibonacci numbers from Fi+1 onwards, if we can provide Fi+1 and Fi+2. Fi+1 is given, so we only need to work out Fi+2. The definition of series gives us Fi+2=Fi+Fi+1, so, there.

-
This is much clearer than @pigworker 's answer. It might be more efficient. –  Aseem Bansal Feb 15 '14 at 13:59