6

to write "map f (map g xs)" as a single call to map you could write

example xs = map (f.g) xs

but how would you write "filter p (filter q xs)" as a single call to filter? the dot operator doesnt seem to work for filter as it does for maps. guessing you'd use something else for predicates?

8 Answers 8

9

If you defined a function both that looked like this:

both :: (a -> Bool) -> (a -> Bool) -> a -> Bool
both f g x = f x && g x

Then you could write:

example xs = filter (both p q) xs

I'm not sure if there's a standard function that does this for you...

1
  • thanks man, that works sure enough. still thinking there might be a more direct way of doing this though (?)
    – derp
    Nov 10, 2009 at 23:52
9
$ ghci
Prelude> :m +Control.Arrow
Prelude Control.Arrow> :t uncurry (&&) . ((0 <) &&& (< 10))
uncurry (&&) . ((0 <) &&& (< 10)) :: (Num a, Ord a) => a -> Bool
Prelude Control.Arrow> filter (uncurry (&&) . ((0 <) &&& (< 10))) [0..15]
[1,2,3,4,5,6,7,8,9]

Or declare your own operators, if you'll be doing this often.

infixr 3 &&:
p &&: q = \a -> p a && q a
infixr 2 ||:
p ||: q = \a -> p a || q a
not' = (.) not
all' = foldr (&&:) $ const True
any' = foldr (||:) $ const False

example xs = filter (p &&: q ||: not' r) xs
6

Why not a list comprehension?

example = [x | x <- xs, p x, q x]
-- for example
example = [x | x <- [1..10], (>3) x, x<5 ] -- [4]
2
  • Yeah, list comprehension works well here. The question actually stems from a tutorial I had this week, the implication being there was a straightforward way of doing this. List comprehension is the quickest I've found so far and I'm starting to think there may be no comparitive way as with map and "function composistions". thanks all!
    – derp
    Nov 11, 2009 at 0:13
  • You could always make a rewrite rule. Convert filter f . filter g to \a -> filter (f a && g a). Of course this is just a substitiute for the more elegant list comprehensions, although this may be faster (hunch).
    – codebliss
    Nov 11, 2009 at 5:18
4

Calling a list of functions on something is essentially what the ap function in Control.Monad does. Then you just and the results. The only slight ugliness is that ap requires both its arguments to be in the same monad (List in this case), so we need to compose it with return to work here.

import Control.Monad
filterByMany funcs = filter (and . ap funcs . return)
4

I would define a lambda expression.

module Main where

overTen :: Int -> Bool
overTen = (>10)

main :: IO ()
main = do
    print $ filter (\x -> overTen x && even x) [1..20]

output:

$ ghci Test.hs
GHCi, version 6.10.4: http://www.haskell.org/ghc/  :? for help
Loading package ghc-prim ... linking ... done.
Loading package integer ... linking ... done.
Loading package base ... linking ... done.
[1 of 1] Compiling Main             ( Test.hs, interpreted )
Ok, modules loaded: Main.
*Main> main
[12,14,16,18,20]
*Main>
1
  • This is what GHC -O2 does automatically (well almost: there are a few different phases of rewrite rules involved and often the intermediate phases get combined with other stuff before/instead of being turned back into a filter) Sep 30, 2016 at 5:54
3
import Data.Foldable
import Data.Monoid

p = (>4)
g = (<10)

main = print $ filter (getAll . foldMap (All.) [p,g]) [1..10]

outputs

[5,6,7,8,9]

just because lists are foldable, and you can combine predicate results with the All monoid

2

What about something like:

example xs = filter (forAll [p,q,r,s,t,u,v]) xs

forAll:: [(a -> Bool)] -> a -> Bool
forAll funcs x = all (map ($ x) funcs)
1
  • you meant, forAll fs x = and [f x | f <- fs]. :) With all it's forAll fs x = all ($ x) fs (without the map). :)
    – Will Ness
    Nov 24, 2013 at 15:16
1

I'd define a helper function -- this could probably be written more declaratively, but I don't have GHCI installed on this system for testing:

allPredicates :: [a -> Bool] -> a -> Bool
allPredicates []     _ = True
allPredicates (p:ps) x = p x && allPredicates ps x

then

filter (allPredicates [p, q]) xs
3
  • allPredicates = (. flip ($)) . flip all
    – ephemient
    Nov 11, 2009 at 16:05
  • 1
    Or the slightly less obfuscated allPredicates x y = all (flip ($) y) x. How efficiently does GHC untangle complex usages of flip? I've seemingly needed to remove usages of flip for performance purposes before. Oh, John's allPredicates might perform quite poorly since recursive functions cannot be inlined. Oh strange, there is no where go ... in Data.List's definition of all, which I'm fairly sure you need for inlining. Apr 22, 2012 at 8:02
  • Ahh no, "static argument transformation" makes it non-recursive : stackoverflow.com/a/9660027/667457 Apr 22, 2012 at 8:10

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