(Sorry in advance if the question is stupid or obvious -- I don't have a lot of experience with Haskell).

Is there a way to express that a type should be an instance of a typeclass in more than one way? This is best illustrated with an example (which is probably somewhat silly): In mathematics, we can say that a semiring is a set that is a commutative monoid under one operation (which we'll call addition, identity 0) and a monoid under another (which we'll call multiplication) along with the requirements that multiplication distributes over addition and that 0 annihilates all elements under multiplication. The latter parts aren't important here.

Suppose now that I have a typeclass `Monoid`

(not to be confused with `Data.Monoid`

),

```
class Monoid m where
unit :: m
operation :: m -> m -> m
```

and would like to create a typeclass `Semiring`

. From the definition given above, I'd like to say "if the type r is a monoid in two (*distinct*) ways, we'll call it semiring". So I'd like something like

```
class (Monoid r, Monoid r) => Semiring r where ...
```

which of course doesn't work. Admittedly, the example becomes a bit strange since there are no more functions we'd like to require for semirings, so the typeclass would be empty, but I hope it illustrates what I'm asking about (or just pretend that we require some function `f:r->r`

for `Semiring r`

).

So, in the general setting, I'm asking: Given a typeclass `A`

, is there a way to parametrize a typeclass `B a`

with the requirement that `a`

be an instance of `A`

in two ways (meaning that `a`

should implement the functions specified by `A`

in two ways)?