I think the primer actually does quite a good job at explaining this, particularly the following:

Natural
language indicators for the usage of
universal quantification are words
like “only,” “exclusively,” or
“nothing but.”

To simplify this a bit further, consider the expression you've given:

`HappyPerson ≡ ∀ hasChild . HappyPerson`

This says that a `HappyPerson`

is someone who **only** has children who are also `HappyPerson`

(are also happy). Logically, this actually says nothing about the existence of instances of happy children. It simply serves as a universal constraint on any children that *may* exist (note that this includes any instances of `HappyPerson`

that don't have any children).

Compare this to the existential quantifier, exists (∃):

`HappyPerson ≡ ∃ hasChild . HappyPerson`

This says that a `HappyPerson`

is someone who has **at least one** child that is also a `HappyPerson`

. In constrast to (∀), this expression actually implies the existence of a happy child for every instance of a `HappyPerson`

.

The answer, albeit initially unintuitive, lies in the interpretation/semantics of the `ObjectAllValuesFrom`

OWL construct in first-order logic (actually, Description Logic). Fundamentally, the `ObjectAllValuesFrom`

construct relates to the logical universal quantifier (∀), and the `ObjectSomeValuesFrom`

construct relates to the logical existential quantifier (∃).