# If “List” is a monoid, what is its “set”?

Just reading through category theory book, and decided to apply it to haskell.

The author defines Monoid as:

Monoid is a set L equipped with a binary operation *:LxL->L and a distinguished unit element u in L such that etc...

Taking a "List" structure as a monoid, it is clear that binary operation is `concat` and unit is `[]`.

But what is the set M here? I tried `L = {set of all lists}` but I think that leads me into trouble with "is L in L?" question, which seems to be the same problem as sets have.

Or am I thinking of something incorrectly?

EDIT: As pointed out by @applicative, Haskell's lists are monoids called the Free monoids!

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In mathematics the trick to avoid "L in L" problems you switch from normal set theory (zermelo-fraenkel) to a distinction between sets and classes and then you can speak of the class of all sets, or the class of all lists. In addition I think you're referring to the Russel paradox, which is about the `{set of all sets that *don't* contain itself}`. –  epsilonhalbe Oct 17 '12 at 7:16
Note that "the set of all lists" is not itself a list, so it doesn't immediately run into contradictions analogous to those found in naive set theory. –  Ben Oct 17 '12 at 7:52
Do you mean `concat :: [[a]] -> [a]` for your binary operation, or `(++) :: [a] -> [a] -> [a]`? There actually is a way in which the former is a monoidal operation, but it's quite an obscure one... –  Ben Millwood Oct 25 '12 at 15:23

## 2 Answers

Instead of saying "List is a Monoid", it would be more accurate to say "For all types a, the type `[a]` is a Monoid". So for any particular type `a`, your L will be `L = {set of all lists of as}`. And with that definition, L can of course not contain itself.

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So... the set will always contain one element? What if we concat two lists, how will that Monoid look? E.g. [a] concat [a]... –  drozzy Oct 17 '12 at 4:38
@drozzy I was talking about the type `[a]` (as in "a list of `a`s"), not the value `[a]` (as in "a list containing a single element called `a`"). –  sepp2k Oct 17 '12 at 4:40
Oh, got it! So isn't that just equivalent to a regular ol' mathematical set with a union operation and an empty set? –  drozzy Oct 17 '12 at 4:45
I like this answer because it's a fairly direct translation from Haskell. `instance Monoid [a]` uses a universally quantified `a`, so it's really `forall a. instance Monoid [a]`. Which, with a little reordering, is quite close to "for all types `a`, the type `[a]` is a Monoid". –  John L Oct 17 '12 at 5:24

For any type `t` you can have that

``````L = all elements of the type [t]
``````

then L is a monoid in the trivial way using `++`. In fact, we formalize this in Haskell

``````class Monoid m where
mempty  :: m
mappend :: m -> m -> m
``````

this is a "class" of types that have the requisite operations to form a monoid, so

``````instance Monoid [a] where
mempty = []
mappend a b = a ++ b
``````

in fact, this is known as the "free monoid on a"

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When you say `all elements of [t]` do you mean, `L={t1, t2, ...}` or `L={ {t1}, {t1, t2},...}`? (where `t1,t2..` are of type `t`) –  drozzy Oct 17 '12 at 4:50
@drozzy: Let's say `t = Bool`, then `L = { [], [False], [True], [False, False], [False, True], [True, False], [True, True], ... }`. (Though strictly speaking you might want to include bottoms as well). –  hammar Oct 17 '12 at 5:04
@hammar and `[True, True, False]` etc... Just clarifying it can be more than two elements, as long as it is "finite" (which is rather weird definition, as I can potentially come up with an infinite set like this - I guess can think of memory limit on computers as a bounding criteria!) –  drozzy Oct 17 '12 at 5:06
@drozzy - it doesn't even need to be finite. `mappend (repeat True) (repeat False)` is perfectly legitimate, for example. –  John L Oct 17 '12 at 5:31
@JohnL I guess I was going by the definition of the Free monoid: "free monoid on a set A is the monoid whose elements are all the finite sequences", which I understand is what Haskell list is. So then Haskell lists are more than just Free monoids? –  drozzy Oct 18 '12 at 1:11