# If return a = return b then does a=b?

Can you prove that if `return a = return b` then `a=b`? When I use `=`, I mean in the laws and proofs sense, not the `Eq` class sense.

Every monad that I know seems to satisfy this, and I can't think of a valid monad that wouldn't (`Const a` is a functor and applicative, but not a monad.)

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Shouldn't this have a tag identifying the language? – Keith Thompson Jan 25 at 23:42
@PyRulez You're absolutely right, sry. – nietonfir Jan 26 at 0:18

``````data Trivial a = Cow

_ >>= _ = Cow
return _ = Cow
``````
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...better known as `Const ()`. – leftaroundabout Jan 25 at 23:47
Why would I pass the opportunity to write `Cow` in a Haskell program? – Andrej Bauer Jan 25 at 23:56
Why indeed... point taken. – leftaroundabout Jan 26 at 0:01
@dfeuer: Parametricity plus the need to comply with the monad laws can be used rule out the middle ground, the trivial monad is the only case where this is violated, everything else needs to call the function passed to `(>>=)` with a valid `a` -- or it'll fails the first monad law. -- `Cont ()` is the trivial monad up to isomorphism -- The proof of both of these observations is left to you as an exercise. ;) There is a dual argument available in the comonad case, if `w a = w b` structurally then either `w` is the uninhabited comonad or `a = b`. – Edward KMETT Jan 26 at 3:39