# Weaker variant of an `Applicative`

transformer

Although it isn't possible to define an applicative transformer for `StateT`

, It's possible to define a weaker variant that works. Instead of having `s -> m (a, s)`

, where the state decides the next effect (therefore `m`

must be a monad), we can use `m (s -> (a, s))`

, or equivalently `m (State s a)`

.

```
import Control.Applicative
import Control.Monad
import Control.Monad.State
import Control.Monad.Trans
newtype StateTA s m a = StateTA (m (State s a))
```

This is strictly weaker than `StateT`

. Every `StateTA`

can be made into `StateT`

(but not vice versa):

```
toStateTA :: Applicative m => StateTA s m a -> StateT s m a
toStateTA (StateTA k) = StateT $ \s -> flip runState s <$> k
```

Defining `Functor`

and `Applicative`

is just the matter of lifting operations of `State`

into the underlying `m`

:

```
instance (Functor m) => Functor (StateTA s m) where
fmap f (StateTA k) = StateTA $ liftM f <$> k
instance (Applicative m) => Applicative (StateTA s m) where
pure = StateTA . pure . return
(StateTA f) <*> (StateTA k) = StateTA $ ap <$> f <*> k
```

And we can define an applicative variant of `lift`

:

```
lift :: (Applicative m) => m a -> StateTA s m a
lift = StateTA . fmap return
```

**Update:** Actually the above isn't necessary, as the composition of two applicative functors is always an applicative functor (unlike monads). Our `StateTA`

is isomorphic to `Compose m (State s)`

, which is automatically `Applicative`

:

```
instance (Applicative f, Applicative g) => Applicative (Compose f g) where
pure x = Compose (pure (pure x))
Compose f <*> Compose x = Compose ((<*>) <$> f <*> x)
```

Therefore we could write just

```
{-# LANGUAGE GeneralizedNewtypeDeriving #-}
import Control.Applicative
import Control.Monad.State
import Data.Functor.Compose
newtype StateTA s m a = StateTA (Compose m (State s) a)
deriving (Functor, Applicative)
```

`WriterT`

,`ExceptT`

), whose`Applicative`

instance requires the underlying type constructor to be a`Monad`

. – kirelagin May 4 '17 at 19:11