# Is eta reduction possible?

Is it possible to apply eta reduction in below case?

``````let normalise = filter (\x -> Data.Char.isLetter x || Data.Char.isSpace x )
``````

I was expecting something like this to be possible:

``````let normalise = filter (Data.Char.isLetter || Data.Char.isSpace)
``````

...but it is not

-

Your solution doesn't work, because `(||)` works on `Bool` values, and `Data.Char.isLetter` and `Data.Char.isSpace` are of type `Char -> Bool`.

pl gives you:

``````\$ pl "f x = a x || b x"
f = liftM2 (||) a b
``````

Explanation: `liftM2` lifts `(||)` to the `(->) r` monad, so it's new type is `(r -> Bool) -> (r -> Bool) -> (r -> Bool)`.

So in your case we'll get:

``````import Control.Monad
let normalise = filter (liftM2 (||) Data.Char.isLetter Data.Char.isSpace)
``````
-
A nice addition to this (stolen from @JAbrahamson) is to define `(<||>) = liftM2 (||)`, then you can use it as `filter (isLetter <||> isSpace)`, and even continue to combine these like `filter (isLetter <||> isSpace <||> (== '1'))`. I find this style to be particularly easy to use and attractive. –  bheklilr May 7 at 13:56

You could take advantage of the `Any` monoid and the monoid instance for functions returning monoid values:

``````import Data.Monoid
import Data.Char

let normalise = filter (getAny . ((Any . isLetter) `mappend` (Any . isSpace)))
``````
-
``````import Control.Applicative
let normalise = filter ((||) <\$> Data.Char.isLetter <*> Data.Char.isSpace)
``````
-
``````import Control.Arrow
`&&&` takes two functions (really arrows) and zips together their results into one tuple. We then just uncurry `||` so it's time becomes `(Bool, Bool) -> Bool` and we're all done!