# Monoids

You might find life becomes a lot easier when you realize that you can stand on the shoulders of giants and take advantage of common abstractions and the libraries built to use them. To this end, this question is basically about dealing with
**monoids** (see related questions below for more about this) and the library in question is called **scalaz**.

Using scalaz FP, this is just:

```
def add(a: Option[Int], b: Option[Int]) = ~(a |+| b)
```

What is more this works on any monoid M:

```
def add[M: Monoid](a: Option[M], b: Option[M]) = ~(a |+| b)
```

Even more usefully, it works on any number of them placed inside a `Foldable`

container:

```
def add[M: Monoid, F: Foldable](as: F[Option[M]]) = ~as.asMA.sum
```

Note that some rather useful monoids, aside from the obvious `Int`

, `String`

, `Boolean`

are:

`Map[A, B: Monoid]`

`A => (B: Monoid)`

`Option[A: Monoid]`

In fact, it's barely worth the bother of extracting your own method:

```
scala> some(some(some(1))) #:: some(some(some(2))) #:: Stream.empty
res0: scala.collection.immutable.Stream[Option[Option[Option[Int]]]] = Stream(Some(Some(Some(1))), ?)
scala> ~res0.asMA.sum
res1: Option[Option[Int]] = Some(Some(3))
```

# Some related questions

*Q. What is a monoid?*

A monoid is a type `M`

for which there exists an associative binary operation `(M, M) => M`

and an identity `I`

under this operation, such that `mplus(m, I) == m == mplus(I, m)`

for all `m`

of type `M`

*Q. What is *`|+|`

?

This is just scalaz shorthand (or ASCII madness, ymmv) for the `mplus`

binary operation

*Q. What is *`~`

?

It is a unary operator meaning "or identity" which is retrofitted (using scala's implicit conversions) by the scalaz library onto `Option[M]`

if `M`

is a monoid. Obviously a non-empty option returns its contents; an empty option is replaced by the monoid's identity.

*Q. What is *`asMA.sum`

?

A `Foldable`

is basically a datastructure which can be folded over (like `foldLeft`

, for example). Recall that `foldLeft`

takes a seed value and an operation to compose successive computations. In the case of summing a monoid, the seed value is the identity `I`

and the operation is `mplus`

. You can hence call `asMA.sum`

on a `Foldable[M : Monoid]`

. You might need to use `asMA`

because of the name clash with the standard library's `sum`

method.

# Some References

- Slides and Video of a talk I gave which gives practical examples of using monoids in the wild