Add to ORKGFine's influential Canonicity Theorem states that if a modal logic is determined by a first-order definable class of Kripke frames, then it is valid in its canonical frames. This article reviews the background and context of this result, and the history of its impact on further research. It then develops a new characterisation of when a logic is canonically valid, providing a precise point of distinction with the property of first-order completeness. The ultimate point is that the construction of the canonical frame of a modal algebra does not commute with the ultrapower construction
We show that modal logic over universally first-order definable classes of transitive frames is deci...
For each natural number $n$ we study the modal logic determined by the class of transitive Kripke fr...
Correspondence theory originally arises as the study of the relation between modal formulas and firs...
We give a sufficient condition for Kripke completeness of the extension of a modal logic with the tr...
It is well known at present that relational semantics for propositional modal logics is far from com...
Abstract. The paper focuses on extending to the first order case the semantical pro-gram for modalit...
Abstract. The paper focuses on extending to the first order case the semantical program for modaliti...
This chapter is constituted by two parts. The ¯rst part comprising Sections 1-5 was written by Torb...
In the present paper I aim at providing a general framework to prove Kripke-completeness for normal ...
Canonical models are of central importance in modal logic, in particular as they witness strong comp...
Canonical models are of central importance in modal logic, in particular as they witness strong comp...
This paper will look at Sahlqvist's theorem in a new way. We introduce and investigate a "...
Modal Logic is traditionally concerned with the intensional operators “possibly ” and “necessary”, w...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
For each natural number $n$ we study the modal logic determined by the class of transitive Kripke fr...
Correspondence theory originally arises as the study of the relation between modal formulas and firs...
We give a sufficient condition for Kripke completeness of the extension of a modal logic with the tr...
It is well known at present that relational semantics for propositional modal logics is far from com...
Abstract. The paper focuses on extending to the first order case the semantical pro-gram for modalit...
Abstract. The paper focuses on extending to the first order case the semantical program for modaliti...
This chapter is constituted by two parts. The ¯rst part comprising Sections 1-5 was written by Torb...
In the present paper I aim at providing a general framework to prove Kripke-completeness for normal ...
Canonical models are of central importance in modal logic, in particular as they witness strong comp...
Canonical models are of central importance in modal logic, in particular as they witness strong comp...
This paper will look at Sahlqvist's theorem in a new way. We introduce and investigate a "...
Modal Logic is traditionally concerned with the intensional operators “possibly ” and “necessary”, w...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
We show that modal logic over universally first-order definable classes of transitive frames is deci...
For each natural number $n$ we study the modal logic determined by the class of transitive Kripke fr...
Correspondence theory originally arises as the study of the relation between modal formulas and firs...