Imagine that I have a value that is generic over the monad:

```
m :: (Monad m) => m A -- 'A' is some concrete type
```

Now let's say that I specialize this value to a concrete monad transformer stack in two separate ways:

```
m1 :: T M A
m1 = m
m2 :: T M A
m2 = lift m
```

... where `M`

and `T M`

are monads, and `T`

is a monad transformer:

```
instance Monad M where ...
instance (Monad m) => Monad (T m) where ...
instance MonadTrans T where ...
```

... and those instances obey the monad laws and monad transformer laws.

Can we deduce that:

```
m1 = m2
```

... knowing nothing about `m`

other than its type?

This is just a long-winded way of asking if `lift m`

is a valid substitution for `m`

, assuming that both type-check. It is a little bit difficult to phrase the question because it requires `m`

type-checking as two separate monads before and after the substitution. As far as I can tell, the only way such a substitution would type-check is if `m`

is generic over the monad.

My vague intuition is that the substitution should always be correct, but I'm not sure that my intuition is correct, or how to prove it if it is correct.