```
ns :: [Integer]
ns = 0 : [n+k | (n, k) <- zip ns [1,3..]]
```

this is a corecursive data definition. `ns`

is a constant, a list, but it is "fleshed out" by access, since Haskell is lazy.

An illustration:

```
1 n1 n2 n3 n4 n5 ... -- the list ns, [n1,n2,n3,...],
2 0 1 4 ... -- starts with 0
3 -----------------
4 1 3 5 7 9 -- [1,3..]
5 -----------------
6 1 4 ... -- sum the lines 2 and 4 pairwise, from left to right, and
7 n2 n3 n4 n5 ... -- store the results starting at (tail ns), i.e. from n2
```

We can see precisely *how* access is forcing the list `ns`

into existence step by step, e.g. after `print $ take 4 ns`

, by naming the interim entities:

```
ns :: [Integer]
ns = 0 : [n+k | (n, k) <- zip ns [1,3..]]
ns = 0 : tail1
tail1 = [n+k | (n, k) <- zip ns [1,3..]]
= [n+k | (n, k) <- zip (0 : tail1) [1,3..]]
= [n+k | (n, k) <- (0,1) : zip tail1 [3,5..]]
= 1 : [n+k | (n, k) <- zip tail1 [3,5..]]
= 1 : tail2
tail2 = [n+k | (n, k) <- zip (1 : tail2) [3,5..]]
= [n+k | (n, k) <- (1,3) : zip tail2 [5,7..]]
= 4 : tail3
tail3 = [n+k | (n, k) <- zip (4 : tail3) [5,7..]]
= 9 : tail4
tail4 = [n+k | (n, k) <- zip (9 : tail4) [7,9..]]
------
ns = 0 : 1 : 4 : 9 : tail4
```

`ns`

IS constant in the sense that it is a function which takes no arguments, and it is pure, so its value depends precisely on the value of 0 arguments; 0 arguments can have precisely 0 unique values; that is to say, its value depends on nothing. "Constant" does not mean "trivial to evaluate" or "finite" or anything like that. What happens in`ns`

is the same thing that happens in`x = 1:x`

. It is obvious that the first value of 'x' is 1, and it is obvious that the next value of x is the first value of x, which is 1, and the next value after that is the fist value of x ... etc. – user2407038 Jan 7 at 21:00