The modal system S4.Grz is the system that results when the axiom (Grz) □(□(p → □p) → p) → □p is added to the modal system S4, i. e. S4.Grz = S4 + Grz. The aim of the present note is to prove in a direct way, avoiding duality theory, that the modal system S4.Grz admits the following alternative definition: S4.Grz = S4 + R-Grz, where R-Grz is an additional inference rule: (R-Grz) ⊢ □(p → □p) → p / ⊢ p This rule is a modal counterpart of the following topological condition: If a subset A of a topological space X coincides with its Hausdorff residue ρ(A) then A is empty. In other words the empty set is a unique "fixed" point of the residue operator ρ(ċ).
We also present some consequences of this alternative axiomatic definition.
[1]
Guram Bezhanishvili,et al.
Scattered, Hausdorff-reducible, and hereditarily irresolvable spaces
,
2003
.
[2]
Leo Esakia,et al.
Intuitionistic logic and modality via topology
,
2004,
Ann. Pure Appl. Log..
[3]
George Boolos,et al.
On systems of modal logic with provability interpretations
,
2008
.
[4]
A. Tarski,et al.
The Algebra of Topology
,
1944
.
[5]
Robert Goldblatt,et al.
Arithmetical necessity, provability and intuitionistic logic
,
2008
.
[6]
Edwin Hewitt,et al.
A problem of set-theoretic topology
,
1943
.
[7]
Andrzej Grzegorczyk.
Some relational systems and the associated topological spaces
,
1967
.