It's well-known that
Monad instances ought to follow the Monad laws. It's perhaps less well-known that
Functor instances ought to follow the Functor laws. Nevertheless, I would feel fairly confident writing a GHC rewrite rule that optimizes
fmap id == id.
What other standard classes have implicit laws? Does
(==) have to be a true equivalence relation? Does
Ord have to form a partial order? A total order? Can we at least assume it's transitive? Anti-symmetric?
These last few don't appear to be specified in the Haskell 2010 report nor would I feel confident writing rewrite rules taking advantage of them. Are there any common libraries which do, however? How pathological an instance can one write confidently?
Finally, assuming that there is a boundary for how pathological such an instance can be is there a standard, comprehensive resource for the laws that each type class instance must uphold?
As an example, how much trouble would I be in to define
newtype Doh = Doh Bool instance Eq Doh where a == (Doh b) = b
is it merely hard to understand or will the compiler optimize incorrectly anywhere?