As jmg said, this isn't valid Haskell so it's good GHC isn't compiling it! If you're used to Java evidently you should think of Haskell's type classes like Java interface. If that doesn't help then perhaps you should read LYAH's chapter on classes.
For you problem, it appears you're wanting a list-like data type that can never be null. You don't need to test for such a property, you can statically ensure it by using a data
type that can never be empty:
-- Notice this data type can never have zero 'a' values!
data NonEmptyList a = NEL a (NonEmptyList a) | Singleton a
-- We can define basic operators for this, just like list has
-- You can't pattern match with them, but there are work-arounds for that if you want to ask
(.:) = NEL -- concatenate non-empty lists
nelHead :: NonEmptyList a -> a
nelHead (NEL a _) = a
nelHead (Singleton a) = a
nelTail :: NonEmptyList a -> Maybe (NonEmptyList a)
nelTail (NEL _ b) = Just b
nelTail _ = Nothing
nelTake :: Int -> NonEmptyList a -> NonEmptyList a
nelTake 1 (NEL a _) = Singleton a
nelTake 1 (Singleton a) = Singleton a
nelTake n (NEL a rest) = a .: nelTake (n-1) rest
nelDrop :: Int -> NonEmptyList a -> NonEmptyList a
nelDrop _ (Singleton _) = error "Perhaps I should have used the 'maybe' type"
nelDrop 1 (NEL a r) = r
nelDrop n (NEL a r) = nelDrop (n-1) r
And so on and so forth. It's worth noting
nelDrop are partial but
nelHead is total, funny as this is the opposite of regular lists.