Hmm, not that I'm aware of. That would be difficult for a Hindley-Milner type system, which forms the basis the type systems for those languages. (In Haskell nomenclature)
Nothing would have to have type
Maybe a and
 a simultaneously.
Something similar (but unfortunately too unwieldy to use in practice IMO) can be constructed using a fixed point type over
-- fixed point
newtype Mu f = In (f (Mu f))
-- functor composition
newtype (f :. g) a = O (f (g a))
type List a = Mu (Maybe :. (,) a)
This is isomorphic to what you are asking for, but is a pain in the butt. We can make a cons function easily:
In (O (Just (1, In (O (Just (2, In (O Nothing)))))))
O are "identity constructors" -- they only exist to guide type checking, so you can mentally remove them and you have what you want. But, unfortunately, you cannot physically remove them.
We can make a
cons function easily. We are not so lucky with pattern matching. I can't speak for the other ML family languages, but IIRC they can't even represent higher-kinded types like