Well, I am studying Haskell Monads. When I read the Wikibook Category theory article, I found that the signature of monad morphisms looks pretty like tautologies in logic, but you need to convert `M a`

to `~~A`

, here `~`

is the logic negation.

```
return :: a -> M a -- Map to tautology A => ~~A, double negation introduction
(>>=) :: M a -> (a -> M b) -> M b -- Map to tautology ~~A => (A => ~~B) => ~~B
```

the other operations is also tautologies:

```
fmap :: (a -> b) -> M a -> M b -- Map to (A => B) -> (~~A => ~~B)
join :: M (M a) -> M a -- Map to ~~(~~A) => ~~A
```

It's also understood that according to the fact that the Curry-Howard correspondence of normal functional languages is the intuitive logic, not classical logic, so we cannot expect a tautology like `~~A => A`

can have a correspondence.

But I am thinking of something else. Why the Monad can only relate to a double negation? what is the correspondence of single negation? This lead me to the following class definition:

```
class Nomad n where
rfmap :: (a -> b) -> n b -> n a
dneg :: a -> n (n a)
return :: Nomad n => a -> n (n a)
return = dneg
(>>=) :: Nomad n => n (n a) -> (a -> n (n b)) -> n (n b)
x >>= f = rfmap dneg $ rfmap (rfmap f) x
```

Here I defined a concept called "Nomad", and it supports two operations (both related to a logic axiom in intuitive logic). Notice the name "rfmap" means the fact that its signature is similar to functor's `fmap`

, but the order of `a`

and `b`

are reversed in result. Now I can re-define the Monad operations with them, with replace `M a`

to `n (n a)`

.

So now let's go to the question part. The fact that Monad is a concept from category theory seems to mean that my "Nomad" is also a category theory concept. So what is it? Is it useful? Are there any papers or research results exists in this topic?

`rfmap`

is an operation on contravariant functors. – shachaf Dec 20 '12 at 12:28`Nomad`

looks like half of a`Monad`

, since`n (n a)`

is a well defined`Monad`

. – Earth Engine Mar 6 at 0:26