# How to compose functions that return Bools to one function

There is a similar question I found here that asks almost the same thing, but not quite.

The question I have is how to compose a list of functions of type (a -> Bool) to be one function that is also (a -> Bool).

Ex.

``````compose :: [(a -> Bool)] -> (a -> Bool)
compose []     = **?**
compose (x:xs) = x **?** compose xs
``````

The question that was similar to this was taking three functions and mixing them all like so:

``````newFunction x f g y = f x || g x || y x
``````

But this is very limited because you have to supply a specific number of functions, and it does not return another function, it returns a Boolean. I essentially want a function that gives me the above function without functions as arguments.

I tried messing with Monoids to make this work but I ran into issues with wrapping the functions into a Monoid in the first place, let alone actually composing them together as newFunction does.

Is there a way to compose a list of functions of type (a -> Bool) to one function of the same type?

• fold with an accumulator function that calls each function and compose it according to your operator with the current result (e.g. ||)? Aug 8 '19 at 14:33
• Willem's answer is nice. Consider that instead, but make sure you work through it and understand just what's going on! Aug 8 '19 at 14:46
• Composition of functions has a specific meaning: the output of one function is used as the input of the next. You are not composing your input functions; you are applying each to the same argument and combining the results in some fashion. Aug 8 '19 at 14:46
• try `GHCi> :t (or .) . sequence`. Aug 8 '19 at 14:57

We can make use of `any :: Foldable => (a -> Bool) -> f a -> Bool` here:

``````compose :: Foldable f => f (a -> Bool) -> a -> Bool
compose = flip (any . flip (\$))``````

or as @chepner suggests, with a `(&)`:

``````import Data.Function((&))

compose :: Foldable f => f (a -> Bool) -> a -> Bool
compose = flip (any . (&))``````

or without the point-free styling (and probably simpler to understand):

``````compose :: Foldable f => f (a -> Bool) -> a -> Bool
compose l x = any (\$ x) l``````

The above will work with any sort of `Foldable`, so a list `[]`, `Maybe`, etc.

• `flip id` always seems a bit odd to me. `Data.Function.(&)` (or at least `flip (\$)`) is equivalent and probably more suggestive of what is happening. Aug 8 '19 at 14:59
• @chepner: you are correct, it is furthermore more "strong" w.r.t. the types, since it adds an extra contract that we deal with functions (although in the overall expression of course, this will be inferenced). Aug 8 '19 at 15:01

Look: `compose xs` in your definition is a function. So you can call it with an argument - like `compose xs a`, - and that will return a `Bool`.

You can use this to define the recursive case.

First of all, the recursive case must return a function - because that's what your type signature states. So it must look something like:

``````compose (x:xs) = \a -> ...
``````

Now, the logic would go like this: first of all, call the first function in the list - like `x a`, - and if it returns true, then that's the result; otherwise, call the composition of the tail - like `compose xs a`. Let's write that down:

``````compose (x:xs) = \a -> x a || compose xs a
``````

Next up, you need to decide what to do with the empty list. Obviously it can be either a function that always returns `True` or a function that always returns `False`, there can be no other options unless you can inspect the argument somehow, which you can't, because it's of generic type.

So, should it return `True` or `False`? Let's see: if it returns `True`, then any composition will always be `True`, that's how the `||` operator works. So we might as well just write `compose _ = \_ -> True`. Therefore, the only sane variant is for it to return `False`.

Summing up all of the above, here's your definition:

``````compose [] = \a -> False
compose (x:xs) = \a -> x a || compose xs a
``````

And of course, you can use a shorter syntax instead of returning lambdas:

``````compose [] a = False
compose (x:xs) a = x a || compose xs a
``````

To implement this using monoids you can use the `Any` (from Data.Monoid) boolean wrapper which implements the disjunction behaviour you want when combining values e.g.

``````(Any False) `mappend` (Any True)
=> Any {getAny = True}
``````

Functions which return monoidal values are themselves monoids - `mappend`ing two such functions returns a function which evalulates the argument on both functions and `mappend`s the results e.g.

``````f :: Int -> Any
f x = Any \$ x > 10

g :: Int -> Any
g x = Any \$ x < 3

comp :: Int -> Any
comp = f `mappend` g

comp 0
=> Any {getAny = True}

comp 4
=> Any {getAny = False}

comp 11
=> Any {getAny = True}
``````

So if you lift each `a -> Bool` into a function `a -> Any` then these be composed with `mappend`.

`mconcat` reduces a list of monoidal values into a single value so applying this to a list of `a -> Any` function returns a function which applies the disjunction to each result. You then need to unwrap the `Bool` from the resulting `Any` value with `getAny`.

``````import Data.Monoid

compose :: [(a -> Bool)] -> (a -> Bool)
compose fs x = let anyfs = map (\f -> Any . f) fs
combined = mconcat anyfs
anyResult = combined x
in getAny anyResult
``````

This can also be written as:

``````compose :: [(a -> Bool)] -> (a -> Bool)
compose = (getAny .) . mconcat . (map (Any .))
``````

As danidiaz points out in the comments, you can also use `foldMap`. This also has a more general type:

``````compose :: Foldable t => t (a -> Bool) -> a -> Bool
compose = (getAny .) . foldMap (Any .)
``````
• Is getAny part of some module? Aug 8 '19 at 14:47
• It's part of the definition of the `Any` type, defined in `Data.Monoid`. `newtype Any = Any {getAny :: Bool }`. It's used to define the Boolean monoid with `||` as the operator. `Any True <> Any False == Any True`, as compared to, say, `All True <> All False == All False` (where `All` uses `&&`). Aug 8 '19 at 14:48
• So I suppose the mconcat function in the second example is essentially just checking (||) for every function? Aug 8 '19 at 15:05
• `map` followed by `mconcat` is so common that it has its own function `foldMap`. This video nicely explains the use of `foldMap` youtube.com/watch?v=BovTQeDK7XI Aug 8 '19 at 17:31

``````compose :: [(a -> Bool)] -> (a -> Bool)