Many modern programming languages allow us to handle potentially infinite lists and to perform certain operations on them.

Example [Python]:

```
EvenSquareNumbers = ( x * x for x in naturals() if x mod 2 == 0 )
```

Such lists can exist because only elements that are actually required are computed. (Lazy evaluation)

I just wondered out of interest whether it's possible (or even practised in certain languages) to extend the mechanism of lazy evaluation to arithmetics.

Example:
Given the infinite list of even numbers `evens = [ x | x <- [1..], even x ]`

We couldn't compute

```
length evens
```

since the computation required here would never terminate.

But we could actually determine that

```
length evens > 42
```

without having to evaluate the whole `length`

term.

Is this possible in any language? What about Haskell?

Edit: To make the point clearer: The question is not about how to determine whether a lazy list is shorter than a given number. It's about using conventional builtin functions in a way that numeric computation is done lazily.

sdcvvc showed a solution for Haskell:

```
data Nat = Zero | Succ Nat deriving (Show, Eq, Ord)
toLazy :: Integer -> Nat
toLazy 0 = Zero
toLazy n = Succ (toLazy (n-1))
instance Num Nat where
(+) (Succ x) y = Succ (x + y)
(+) Zero y = y
(*) Zero y = Zero
(*) x Zero = Zero
(*) (Succ x) y = y + (x * y)
fromInteger = toLazy
abs = id
negate = error "Natural only"
signum Zero = Zero
signum (Succ x) = Succ Zero
len [] = Zero
len (_:x') = Succ $ len x'
-- Test
len [1..] < 42
```

Is this also possible in other languages?

`Perl6`

has lazy lists perlcabal.org/syn/S09.html#Lazy_lists – Brad Gilbert Sep 20 '09 at 16:12