Add to ORKGWe introduce the variety of Hilbert algebras with a modal operator , called H-algebras. The variety of H-algebras is the algebraic counterpart of the f!;g-fragment of the intuitionitic modal logic IntK. We will study the theory of representation and we will give a topological duality for the variety of H-algebras. We are going to use these results to prove that the basic implicative modal logic IntK! and some axiomatic extensions are canonical. We shall also to determine the simple and subdirectly irreducible algebras in some subvarieties of H-algebras
We consider the families of propositional superintuitionistic logics (s.i.l.) and NE(K) of normal m...
summary:We modify slightly the definition of $H$-partial functions given by Celani and Montangie (20...
We describe the pullback construction in the category of Hilbert C*-modules (with a suitable class o...
A b s t r a c t. We introduce the variety of Hilbert algebras with a modal operator , called H-algeb...
We introduce the variety of Hilbert algebras with a modal operator , called H -algebras. The variet...
In this paper, we will study a particular subvariety of Hilbert algebras with a modal operator □ , c...
We study connections between four types of modal operators – necessity, possibility, un-necessity an...
We present a duality for the intuitionistic modal logic IK introduced by Fischer Servi in [10, 11]. ...
International audienceWe define a family of intuitionistic non-normal modal logics; they can be seen...
We give the characterization and description of all full Hilbert modules and associated algebras hav...
AbstractIn this work we shall give a characterization of the Hilbert algebras given by the order and...
This paper investigates (modal) extensions of Heyting–Brouwer logic, i.e., the logic which results w...
Categorical dualities are an important tool in the study of (modal) logics. They offer conceptual un...
We consider the families L of propositional superintuitionistic logics (s.i.l.) and N E(K) of norma...
Celani and Jansana (Math Log Q 58(3):188–207, 2012) give an explicit description of the free implica...
We consider the families of propositional superintuitionistic logics (s.i.l.) and NE(K) of normal m...
summary:We modify slightly the definition of $H$-partial functions given by Celani and Montangie (20...
We describe the pullback construction in the category of Hilbert C*-modules (with a suitable class o...
A b s t r a c t. We introduce the variety of Hilbert algebras with a modal operator , called H-algeb...
We introduce the variety of Hilbert algebras with a modal operator , called H -algebras. The variet...
In this paper, we will study a particular subvariety of Hilbert algebras with a modal operator □ , c...
We study connections between four types of modal operators – necessity, possibility, un-necessity an...
We present a duality for the intuitionistic modal logic IK introduced by Fischer Servi in [10, 11]. ...
International audienceWe define a family of intuitionistic non-normal modal logics; they can be seen...
We give the characterization and description of all full Hilbert modules and associated algebras hav...
AbstractIn this work we shall give a characterization of the Hilbert algebras given by the order and...
This paper investigates (modal) extensions of Heyting–Brouwer logic, i.e., the logic which results w...
Categorical dualities are an important tool in the study of (modal) logics. They offer conceptual un...
We consider the families L of propositional superintuitionistic logics (s.i.l.) and N E(K) of norma...
Celani and Jansana (Math Log Q 58(3):188–207, 2012) give an explicit description of the free implica...
We consider the families of propositional superintuitionistic logics (s.i.l.) and NE(K) of normal m...
summary:We modify slightly the definition of $H$-partial functions given by Celani and Montangie (20...
We describe the pullback construction in the category of Hilbert C*-modules (with a suitable class o...