+ mcomp (mcomp j k) l (that is, (j <=< k) <=< l) == mcomp j (mcomp k l)
+ mcomp mid k (that is, mid <=< k) == k
+ mcomp k mid (that is, k <=< mid) == k
+
+ You could just as well express the Monad laws using `>=>`:
+
+ l >=> (k >=> j) == (l >=> k) >-> j
+ k >=> mid == k
+ mid >=> k == k
+
+ If you have any of `mcomp`, `mpmoc`, `mbind`, or `join`, you can use them to define the others. Also, with these functions you can define `m$` and `map2` from *MapNables*. So with Monads, all you really need to get the whole system of functions are a definition of `mid`, on the one hand, and one of `mcomp`, `mbind`, or `join`, on the other.
+
+ In practice, you will often work with `>>=`. In the Haskell manuals, they express the Monad Laws using `>>=` instead of the composition operators. This looks similar, but doesn't have the same symmetry:
+
+ u >>= (\a -> k a >>= j) == (u >>= k) >>= j
+ u >>= mid == u
+ mid a >>= k == k a
+
+ Also, Haskell calls `mid` `return` or `pure`, but we've stuck to our terminology in this context.
+
+ > <small>In Category Theory discussion, the Monad Laws are instead expressed in terms of `join` (which they call `μ`) and `mid` (which they call `η`). These are assumed to be "natural transformations" for their box type, which means that they satisfy these equations with that box type's `map`:
+ > <pre>map f ○ mid == mid ○ f<br>map f ○ join == join ○ map (map f)</pre>
+ > The Monad Laws then take the form:
+ > <pre>join ○ (map join) == join ○ join<br>join ○ mid == id == join ○ map mid</pre>
+ > The first of these says that if you have a triply-boxed type, and you first merge the inner two boxes (with `map join`), and then merge the resulting box with the outermost box, that's the same as if you had first merged the outer two boxes, and then merged the resulting box with the innermost box. The second law says that if you take a box type and wrap a second box around it (with `mid`) and then merge them, that's the same as if you had instead mapped a second box around the elements of the original (with `map mid`, leaving the original box on the outside), and then merged them.<p>
+ > The Category Theorist would state these Laws like this, where `M` is the endofunctor that takes us from type `α` to type <code><u>α</u></code>:
+ > <pre>μ ○ M(μ) == μ ○ μ<br>μ ○ η == id == μ ○ M(η)</pre></small>
+
+
+
+## Interdefinitions and Subsidiary notions##
+
+We said above that various of these box type operations can be defined in terms of others. Here is a list of various ways in which they're related. We try to stick to the consistent typing conventions that:
+
+<pre>
+f : α -> β; g and h have types of the same format (note that α and β are permitted to be, but needn't be, boxed types)
+j : α -> <u>β</u>; k and l have types of the same format
+u : <u>α</u>; v and xs and ys have types of the same format
+w : <span class="box2">α</span>
+</pre>
+
+But we may sometimes slip.
+
+Here are some ways the different notions are related:
+
+<pre>
+j >=> k ≡= \a. (j a >>= k)
+u >>= k == (id >=> k) u; or ((\(). u) >=> k) ()
+u >>= k == join (map k u)
+join w == w >>= id
+map2 f xs ys == xs >>= (\x. ys >>= (\y. mid (f x y)))
+map2 f xs ys == (map f xs) m$ ys, using m$ as an infix operator
+fs m$ xs == fs >>= (\f. map f xs)
+m$ == map2 id
+map f xs == mid f m$ xs
+map f u == u >>= mid ○ f
+</pre>
+
+
+Here are some other monadic notion that you may sometimes encounter:
+
+* <code>mzero</code> is a value of type <code><u>α</u></code> that is exemplified by `Nothing` for the box type `Maybe α` and by `[]` for the box type `List α`. It has the behavior that `anything m$ mzero == mzero == mzero m$ anything == mzero >>= anything`. In Haskell, this notion is called `Control.Applicative.empty` or `Control.Monad.mzero`.
+
+* Haskell has a notion `>>` definable as `\u v. mid (const id) m$ u m$ v`. It works like this: `u >> v == u >>= const v`. This is often useful, and won't in general be identical to just `v`. For example, using the box type `List α`, `[1,2,3] >> [4,5] == [4,5,4,5,4,5]`. But in the special case of `mzero`, it is a consequence of what we said above that `anything >> mzero == mzero`. Haskell also calls `>>` `Control.Applicative.*>`.