For `foldr`

we have the *fusion law*: if `f`

is strict, `f a = b`

, and

`f (g x y) = h x (f y)`

for all `x, y`

, then `f . foldr g a = foldr h b`

.

How can one discover/derive a similar law for `foldr1`

? (It clearly can't even take the same form - consider the case when both sides act on `[x]`

.)