# In composite StateT / Maybe monad, how to take either possibility that succeeds?

``````type StatefulMaybe a = StateT Int Maybe a
``````

This is a computation that can succeed (returning a value) or fail. If it succeeds, it carries a state along with the returned value.

I'd like to write a function

``````choice :: StatefulMaybe a -> StatefulMaybe a -> StatefulMaybe a
``````

that takes two such computations and returns the first one (if any) that succeeds. Only state changes by the successful computation are carried forward.

In fact after some experimentation I figured out how to write this. Here it is:

``````orMaybe :: Maybe a -> Maybe a -> Maybe a
orMaybe (Just x) _ = Just x
orMaybe Nothing x = x

choice :: StatefulMaybe a -> StatefulMaybe a -> StatefulMaybe a
choice mx my = StateT (\s ->
(runStateT mx s) `orMaybe` (runStateT my s)
)
``````

It works:

``````foo :: StatefulMaybe String
foo = do
modify (+ 20)
fail "didn't succeed"

baz :: StatefulMaybe String
baz = do
modify (+ 30)
return "two"

bar :: StatefulMaybe String
bar = do
s <- choice foo baz
return (s ++ " done")

> runStateT bar 0
Just ("two done",30)
``````

My question is this: Is there some easier or more natural way to write this choice function than my implementation above? In particular, is there some way I can lift the `orMaybe` function into my monad?

• `orMaybe` is `mplus` from `MonadPlus` -- I think using `mplus` instead of `choice` should work, too. – luqui Apr 7 at 19:58

If I understand the question correctly, I think that this function already exists: <|>:

``````bar :: StatefulMaybe String
bar = do
s <- foo <|> baz
return (s ++ " done")
``````

The `<|>` function is part of the `Applicative` type class, of which `StateT` is an instance when the inner monad is both a `Functor` and `MonadPlus` instance, which is true for `Maybe`.

``````*Q66992923> runStateT bar 0
Just ("two done",30)
``````

As luqui suggests in the comment, I think that `mplus` ought to work, too, since the default implementation of `mplus` is `<|>`.

• Fantastic. I just knew there had to be an easier way. :) – Adam Dingle Apr 8 at 5:37