I'm reading the paper *Typed Logical Variables in Haskell*, but I'm failing to understand the details of the ultimate implementation. In particular, the backtracking state transformer introduced in section 4. For some reason, unknown to me, GHC believes I require a `MonadPlus`

instance for `(ST a)`

in the function `unify`

, below:

```
newtype BackT m a = BT { run :: forall b . (a -> m [b]) -> m [b] }
instance (Monad m) => Monad (BackT m) where
return a = BT (\k -> k a)
BT m >>= f = BT (\k -> m (\a -> run (f a) k))
instance (MonadPlus m) => MonadPlus (BackT m) where
mzero = BT (\s -> mzero)
f `mplus` g = BT (\s -> (run f) s `mplus` (run g) s)
type LP a = BackT (ST a)
type LR = STRef
type Var s a = LR s (Maybe a)
data Atom s = VarA (Var s (Atom s)) | Atom String
class Unify b a | a -> b where
var :: a -> Maybe (Var b a)
unify :: a -> a -> LP s ()
instance Unify s (Atom s) where
var (VarA a) = Just a
var _ = Nothing
unify (Atom a) (Atom b) | a == b = return () -- type checks
unify _ _ = mzero -- requires MonadPlus (ST a) instance
```

I'm unsure what the problem is, and how to fix it. I was under the impression that I understood the preceding discussion and code until this point, but apparently I was mistaken. If someone could point out what's going awry - do I need a `MonadPlus (ST a)`

instance or not? - it would be very helpful.

**[EDIT: Clarification]** I should have pointed out that the *authors* appear to claim that `mzero`

, or some variation on `mzero`

, is the appropriate function. I just don't know what the appropriate function is. What I'm wondering is whether I am supposed to make a `MonadPlus (ST a)`

instance or I'm not using the correct function, and have misread something.

`unify`

is`LP s ()`

, or`BackT (ST a) ()`

. So apparently the`BackT m`

instance of`MonadPlus`

requires`MonadPlus m`

. Could you include that instance here? – Sjoerd Visscher Oct 6 '11 at 23:06