Why do we need monads?
- We want to program only using functions. ("functional programming (FP)" after all).
Then, we have a first big problem. This is a program:
f(x) = 2 * x
g(x,y) = x / y
How can we say what is to be executed first? How can we form an ordered sequence of functions (i.e. a program) using no more than functions?
Solution: compose functions. If you want first
f, just write
f(g(x,y)). This way, "the program" is a function as well:
main = f(g(x,y)). OK, but ...
More problems: some functions might fail (i.e.
g(2,0), divide by 0). We have no "exceptions" in FP (an exception is not a function). How do we solve it?
Solution: Let's allow functions to return two kind of things: instead of having
g : Real,Real -> Real(function from two reals into a real), let's allow
g : Real,Real -> Real | Nothing(function from two reals into (real or nothing)).
But functions should (to be simpler) return only one thing.
Solution: let's create a new type of data to be returned, a "boxing type" that encloses maybe a real or be simply nothing. Hence, we can have
g : Real,Real -> Maybe Real. OK, but ...
What happens now to
fis not ready to consume a
Maybe Real. And, we don't want to change every function we could connect with
gto consume a
Solution: let's have a special function to "connect"/"compose"/"link" functions. That way, we can, behind the scenes, adapt the output of one function to feed the following one.
In our case:
g >>= f(connect/compose
f). We want
g's output, inspect it and, in case it is
Nothingjust don't call
Nothing; or on the contrary, extract the boxed
fwith it. (This algorithm is just the implementation of
Maybetype). Also note that
>>=must be written only once per "boxing type" (different box, different adapting algorithm).
Many other problems arise which can be solved using this same pattern: 1. Use a "box" to codify/store different meanings/values, and have functions like
gthat return those "boxed values". 2. Have a composer/linker
g >>= fto help connecting
g's output to
f's input, so we don't have to change any
Remarkable problems that can be solved using this technique are:
having a global state that every function in the sequence of functions ("the program") can share: solution
We don't like "impure functions": functions that yield different output for same input. Therefore, let's mark those functions, making them to return a tagged/boxed value: