In wikipedia, the bottom type is simply defined as "the type that has no values". However, if `b`

is this empty type, then the product type `(b,b)`

has no values either, but seems different from `b`

. I agree bottom is uninhabited, but I don't think this property suffices to define it.

By the Curry-Howard correspondence, bottom is associated to mathematical falsity. Now there is a logical principle stating that from False follows any proposition. By Curry-Howard, that means the type `forall a. bottom -> a`

is inhabited, ie there exists a family of functions `f :: forall a. bottom -> a`

.

What are those functions `f`

? Do they help define bottom, maybe as the infinite product of all types `forall a. a`

?