An example of a Foldable which is not a Functor (or not Traversable)?
Here's a fully parametric example:
data Weird a = Weird a (a -> a)
instance Foldable Weird where
foldMap f (Weird a b) = f $ b a
Weird is not a Functor because a occurs in a negative position.
Here's an easy example: Data.Set.Set. See for yourself.
The reason for this should be apparent if you examine the types of the specialized fold and map functions defined for Set:
foldr :: (a -> b -> b) -> b -> Set a -> b
map :: (Ord a, Ord b) => (a -> b) -> Set a -> Set b
Because the data structure relies on a binary search tree internally, an Ord constraint is needed for elements. Functor instances must allow any element type, so that's not viable, alas.
Folding, on the other hand, always destroys the tree to produce the summary value, so there's no need to sort the intermediate results of the fold. Even if the fold is actually building a new Set, the responsibility for satisfying the Ord constraint lies on the accumulation function passed to the fold, not the fold itself.
The same will probably apply to any container type that's not fully parametric. And given the utility of Data.Set, this makes the remark you quoted about "interesting" Foldables seem a bit suspect, I think!
Reading Beautiful folding
I realized that any Foldable can be made a Functor by wrapping it into
data Store f a b = Store (f a) (a -> b)
with a simple smart contructor:
store :: f a -> Store f a a
store x = Store x id
(This is just a variant of the Store comonad data type.)
Now we can define
instance Functor (Store f a) where
fmap f (Store x g) = Store x (f . g)
instance (F.Foldable f) => F.Foldable (Store f a) where
foldr f z (Store x g) = F.foldr (f . g) z x
This way, we can make both Data.Set.Set and Sjoerd Visscher's Weird a functor. (However, since the structure doesn't memoize its values, repeatedly folding over it could be very inefficient, if the function that we used in fmap is complex.)
Update: This also provides an example of a structure that is a functor, foldable but not traversable. To make Store traversable, we would need to make (->) r traversable. So we'd need to implement
sequenceA :: Applicative f => (r -> (f a)) -> f (r -> a)
Let's take Either b for f. Then we'd need to implement
sequenceA' :: (r -> Either b a) -> Either b (r -> a)
Clearly, there is no such function (you can verify with Djinn). So we can neither realize sequenceA.