A.1. Basic concepts

Concept Negative definition Positive definition
φ is entailed by Γ
Γ ⇒ φ
There is no logically possible world in which φ is false while all members of Γ are true. φ is true in every logically possible world in which all members of Γ are true.
φ and ψ are (logically) equivalent
φ ⇔ ψ
There is no logically possible world in which φ and ψ have different truth values. φ and ψ have the same truth value as each other in every logically possible world.
φ is a tautology
⇒ φ
(or ⊤ ⇒ φ)
There is no logically possible world in which φ is false. φ is true in every logically possible world.
φ is inconsistent with Γ
Γ, φ ⇒ 
(or Γ, φ ⇒ ⊥)
There is no logically possible world in which φ is true while all members of Γ are true. φ is false in every logically possible world in which all members of Γ are true.
Γ is inconsistent
Γ ⇒ 
(or Γ ⇒ ⊥)
There is no logically possible world in which all members of Γ are true. In every logically possible world, at least one member of Γ is false.
φ is absurd
φ ⇒ 
(or φ ⇒ ⊥)
There is no logically possible world in which φ is true. φ is false in every logically possible world.
Σ is rendered exhaustive by Γ
Γ ⇒ Σ
There is no logically possible world in which all members of Σ are false while all members of Γ are true. At least one member of Σ is true in each logically possible world in which all members of Γ are true
Glen Helman 15 Aug 2006