Note that while Russel's Paradox helps to suggest that this might be non-computable, it still fails even if you change it to `s = [e | e <- x, elem e s]`

.

Here's an instructive manual expansion. For any non-empty list, `x`

```
s = [e | e <- x, not (e `elem` s)]
```

simplifies to

```
s = do e <- x
guard (not (e `elem` s))
return e
s = x >>= \e -> if (not (e `elem` s)) then return e else mzero
s = concatMap (\e -> if (not (e `elem` s)) then [e] else []) x
s = foldr ((++) . (\e -> if (not (e `elem` s)) then [e] else [])) [] x
s = foldr (\e xs -> if (not (e `elem` s)) then (e:xs) else xs) [] x
s = foldr (\e ys -> if (e `elem` s) then ys else (e:ys)) [] x
```

which we can then begin evaluating. Since `x`

was non-empty we can replace it with `x:xs`

and inline a `foldr`

```
let f = (\e ys -> if (e `elem` s) then ys else (e:ys))
s = f x (foldr f [] xs)
s = (\ys -> if (x `elem` s) then ys else (x:ys)) (foldr f [] xs)
s = (\ys -> if (x `elem` f x (foldr f [] xs)) then ys else (x:ys)) (foldr f [] xs)
```

which is where we have our infinite loop—in order to evaluate `f x (foldr f [] xs)`

we must evaluate `f x (foldr f [] xs)`

. You might say that the definition of `s`

is not "productive enough" to kickstart its self-recursion. Compare this to the trick `fibs`

definition

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

which is kick-started with `1:1:...`

in order to be "productive enough". In the case of `s`

, however, there's no (simple) way to be productive enough (see Will Ness' comment below for a fiendish workaround).

If we don't have the not there, it just switches the order of the branches on the `if`

, which we never reach anyway.

`s`

. – Ganymede Sep 10 '13 at 20:51`s = filter (`notElem`s) x`

(which clearly causes an unbounded recursion). -- or as closed expression, it is`mks [] s = s; mks (y:ys) s = [y | y`notElem`s] ++ mks ys s`

so that`s = mks x s`

(which is suggestive of the fix`mks [] s = []; mks (y:ys) s = let a=[y | y`notElem`s]; s2=a++s in a++mks ys s2`

with`s = mks x []`

). – Will Ness Sep 11 '13 at 17:08