Uploaded by
Published on

This package provides binary operators which allow for easy and more readable point-free function composition.

<. and .>

These are nearly identical to <<< and >>>, the only difference being .> is left-associative whereas >>> is right-associative.

<.. and ..>

These operators let you compose a function of two arguments with a function of one argument.

f <.. g = \x y -> f (g x y)

Operators of this type exist up to <.....

<~. and ~.>

Here we encounter a new convention. While the . has represented an argument that will be put through both functions, the ~ represents an argument that goes straight to the outer function.

f <~. g = \x y -> f x (g y)`

All permutations of up to 4 ~s and .s where the symbols don't mix, the ~s are ahead of the .s, with at least one . exist as operators.

~$ and ~#

Using the convention we just introduced above, you might be able to guess what these operators do. They allow you to apply an argument to the second position in a function.

f ~$ y = \x -> f x y

~$ is actually the familiar flip function in operator form! These operators exist up to ~~~~$.

Not only do these operators allow you to compose functions nicely, they also compose well with each other! Say I wanted to write

\x y -> f (g x) (h y)

point-free. No single operator can do that for you, but by combining them we can achieve this!

f <. g <~. h