# Function imposed on a list

I'm trying to write a Haskell function that takes makes use of this function:

E(x,y)(i,j) = ((i*i) - (j*j) + x, (2*i*j) + y)

The list `F(x,y)` of a point `(x,y)` should be an infinite list of items:

F(x,y) = {(0,0) , F(x,y)(0,0), F(x,y)(F(x,y)(0,0)), F(x,y)(F(x,y)(F(x,y)(0,0))), and so forth}

From my understanding, the nth entry of a list `F(x,y)` is the `E(x,y)` function composed with itself n times and then applied to `(0,0)`

This is what I'm thinking so far:

``````entry :: (Int,Int) -> [(Int,Int)]
efunction (i,j)(x,y) =  ((i*i) - (j*j) + x, (2*i*j) + y)
entry (x,y) = efunction(0,0)(x,y) where
efunction = (0,0) : iterate efunction(i,j)
``````

Also, `(x,y)=(0,0)` and remains static. The only variables that change are `(i,j)`.

A sample output would be

``````entry(1,1) =
0,0
1,1
1,3
-7,7
1,-97
``````

I'm pretty new to Haskell so I'm been trying to wrap my head around why this doesn't work and how to actually make it work. Any help?

-
On a side note, Haskell supports complex numbers out of the box, via the Data.Complex module. –  David Oct 1 '12 at 22:31
Thank you very much! –  user1712985 Oct 1 '12 at 22:49
The only reason I see that your code doesn't work is that you have efunction declared right between entry's type declaration and definition. Just move efunction above entry, below entry, or into a where clause inside entry. –  NovaDenizen Oct 3 '12 at 1:43

You're on a good way, using `iterate` is the right thing. You have a function of two arguments, and want to iterate it with one of the arguments fixed. It's more convenient to use in `iterate` if the fixed argument is the first, so let's define

``````step (x,y) (i,j) = (i*i - j*j + x, 2*i*j + y)
``````

Then you get your desired list by iterating the partially applied function `step (x,y)` with an initial point of `(0,0)`,

``````entry (x,y) = iterate (step (x,y)) (0,0)
``````

It may be more easy to follow if you define a local function using the argument of `entry` instead of the partially applied `step`,

``````entry (x,y) = iterate next (0,0)
where
next (u,v) = (u*u - v*v + x, 2*u*v + y)
``````

Have fun producing your Mandelbrot set ;)

-
Thank you very much !! –  user1712985 Oct 1 '12 at 22:44