Add to ORKGWe investigate the canonicity of inequalities of the intuitionistic mu-calculus. The notion of canonicity in the presence of fixed point operators is not entirely straightforward. In the algebraic setting of canonical extensions we examine both the usual notion of canonicity and what we will call tame canonicity. This latter concept has previously been investigated for the classical mu-calculus by Bezhanishvili and Hodkinson. Our approach is in the spirit of Sahlqvist theory. That is, we identify syntactically-defined classes of inequalities, namely the restricted inductive and tame inductive inequalities, which are, respectively, canonical or tame canonical. Our approach is to use an algorithm which processes inequalities with the aim of e...
In this thesis we study correspondence and canonicity for non-classical logic using algebraic and or...
We study the proof-theoretic relationship between two deductive systems for the modal mu-calculus. F...
The modal mu-calculus is a very expressive formalism extending basic modal logic with least and grea...
In the present paper, the algorithmic correspondence theory developed in Conradie and Palmigiano [9]...
We prove the canonicity of inductive inequalities in a constructive meta-theory, for classes of logi...
The theory of canonical extensions typically considers extensions of maps A→B to maps Aδ→Bδ. In the ...
Canonicity. Canonicity is a fundamental notion in modal logic and other logics for which semantics b...
We define the algorithm ALBA for the language of the same distributive modal logic (DML) for which a...
We prove an algebraic canonicity theorem for normal LE-logics of arbitrary signature, in a generaliz...
We investigate the structure of the modal mu-calculus L-mu with respect to the question of how many ...
AbstractWe define the algorithm ALBA for the language of the same distributive modal logic (DML) for...
For a regular cardinal kappa, a formula of the modal mu-calculus is kappa-continuous in a variable x...
Correspondence theory originally arises as the study of the relation between modal formulas and firs...
In this paper we give some abstractions that preserve sublanguages of the universal part of the bran...
Generalizing standard monadic second-order logic for Kripke models, weintroduce monadic second-order...
In this thesis we study correspondence and canonicity for non-classical logic using algebraic and or...
We study the proof-theoretic relationship between two deductive systems for the modal mu-calculus. F...
The modal mu-calculus is a very expressive formalism extending basic modal logic with least and grea...
In the present paper, the algorithmic correspondence theory developed in Conradie and Palmigiano [9]...
We prove the canonicity of inductive inequalities in a constructive meta-theory, for classes of logi...
The theory of canonical extensions typically considers extensions of maps A→B to maps Aδ→Bδ. In the ...
Canonicity. Canonicity is a fundamental notion in modal logic and other logics for which semantics b...
We define the algorithm ALBA for the language of the same distributive modal logic (DML) for which a...
We prove an algebraic canonicity theorem for normal LE-logics of arbitrary signature, in a generaliz...
We investigate the structure of the modal mu-calculus L-mu with respect to the question of how many ...
AbstractWe define the algorithm ALBA for the language of the same distributive modal logic (DML) for...
For a regular cardinal kappa, a formula of the modal mu-calculus is kappa-continuous in a variable x...
Correspondence theory originally arises as the study of the relation between modal formulas and firs...
In this paper we give some abstractions that preserve sublanguages of the universal part of the bran...
Generalizing standard monadic second-order logic for Kripke models, weintroduce monadic second-order...
In this thesis we study correspondence and canonicity for non-classical logic using algebraic and or...
We study the proof-theoretic relationship between two deductive systems for the modal mu-calculus. F...
The modal mu-calculus is a very expressive formalism extending basic modal logic with least and grea...