(*This answer stole its definitions from http://stackoverflow.com/a/3870310/200266 and only tries to give a rough explanation. My knowledge of category theory is rather basic.*)

In the generic case, saying that a monad is also a monoid is only valid, if you consider the functor (eg. `T => Option[T]`

) and not the values (eg. `Some(3)`

or `None`

).

As an example for a monoid over values, let’s have a look at `List[T]`

.

We have a binary operation **• : S × S -> S**:

```
def append[T](list1: List[T], list2: List[T]): List[T] = list1 append list2
```

and the empty list `Nil`

is obviously the identity element. There is no `append`

method in every monad, though, so the above cannot be generalised onto all monads. Let’s change the definition of the binary operation a bit.

Now, in the above case **×** can be seen as returning a tuple of the input values:

```
List[T] × List[T] => (List[T], List[T])
```

And our `append`

function receives this tuple as its input.

However, we may change the tupling operation **×** to **∘**, now meaning functor composition.

```
(K => List[K]) ∘ (K => List[K]) => (K => List[List[K]])
```

And so, we’re looking for a function fulfilling **μ : T ∘ T -> T** or more specific

```
(K => List[List[K]]) => (K => List[K])
```

That operation is known in Scala as `flatten`

(`join`

in Haskell). The monoid’s identity element is the the monad constructor which has no generic name in Scala (`return`

in Haskell), but which exists for every monad. Eg. `x => List(x)`

.

To wrap things up, considering this and the other answers in this question, there are three possibilities for how a monad can be a monoid:

A) Every monad is also a monoid in the above sense under functor composition.

B) Every monad `M[T]`

has a monoid if there is also a monoid (with some binary operation `~+~`

) for T: `for {x <- ma; y <- mb} yield x ~+~ y`

C) *Some* monads may have one or more specific monoids which differs from the one in B. For example `List`

’s append or `Option`

’s `orElse`

.

`ma`

and`mb`

? For instance`Option(1)`

and`Option(2)`

? – senia Feb 17 at 11:30`append`

a binary associative operation? What is`Some(z)`

append {`Some(x)`

append`Some(y)`

}? Is that the same if you change order? – S.R.I Feb 17 at 11:39`Some(1) * Some(2)`

. What is`*`

here ? – Michael Feb 17 at 12:26`*`

==`join`

/`flatten`

;1==`return`

.) – Debilski Feb 17 at 12:34