We investigate intermediate logics between the bunched logics Boolean BI and Classical BI, obtained by combining classical propositional logic with various flavours of Hyland and De Paiva’s full intuitionistic linear logic. Thus, in addition to the usual multiplicative conjunction (with its adjoint implication and unit), our logics also feature a multiplicative disjunction (with its adjoint co-implication and unit). The multiplicatives behave “sub-classically”, in that disjunction and conjunction are related by a weak distribution principle, rather than by De Morgan equivalence. We formulate a Kripke semantics, covering all our sub-classical bunched logics, in which the multiplicatives are naturally read in terms of resource operations. Our...
International audienceIn this paper, we study Boolean BI Logic (BBI) from a semantic perspective. Th...
International audienceAlong the lines of Abramsky's "Proofs-as-Processes" program, we present an int...
Bi-Intuitionistic Linear Logic (BILL) is an extension of Intuitionistic Linear Logic with a par, dua...
We investigate intermediate logics between the bunched logics Boolean BI and Classical BI, obtained ...
We formulate and investigate a bi-intuitionistic extension, BiBBI, of the well known bunched logic B...
© 2006 Benjamin Robert Horsfall.This is a study of the semantics and proof theory of the logic of bu...
This is a study of the semantics and proof theory of the logic of bunched implications (BI), which i...
AbstractWe introduce the logic of bunched implications, BI, in which multiplicative (or linear) and ...
Article dans revue scientifique avec comité de lecture. internationale.International audienceIn this...
Stone-type duality theorems, which relate algebraic and relational/topological models, are importan...
AbstractThe logic of bunched implications, BI, is a substructural system which freely combines an ad...
We present a connection-based characterization of propositional BI (logic of bunched implications), ...
An intuitionistic, hybrid modal logic suitable for reasoning about distribution of resources was int...
We consider the classical (propositional) version, CBI, of O’Hearn and Pym’s logic of bunched implic...
This article presents a new (multivalued) semantics for classical propositional logic. We begin by m...
International audienceIn this paper, we study Boolean BI Logic (BBI) from a semantic perspective. Th...
International audienceAlong the lines of Abramsky's "Proofs-as-Processes" program, we present an int...
Bi-Intuitionistic Linear Logic (BILL) is an extension of Intuitionistic Linear Logic with a par, dua...
We investigate intermediate logics between the bunched logics Boolean BI and Classical BI, obtained ...
We formulate and investigate a bi-intuitionistic extension, BiBBI, of the well known bunched logic B...
© 2006 Benjamin Robert Horsfall.This is a study of the semantics and proof theory of the logic of bu...
This is a study of the semantics and proof theory of the logic of bunched implications (BI), which i...
AbstractWe introduce the logic of bunched implications, BI, in which multiplicative (or linear) and ...
Article dans revue scientifique avec comité de lecture. internationale.International audienceIn this...
Stone-type duality theorems, which relate algebraic and relational/topological models, are importan...
AbstractThe logic of bunched implications, BI, is a substructural system which freely combines an ad...
We present a connection-based characterization of propositional BI (logic of bunched implications), ...
An intuitionistic, hybrid modal logic suitable for reasoning about distribution of resources was int...
We consider the classical (propositional) version, CBI, of O’Hearn and Pym’s logic of bunched implic...
This article presents a new (multivalued) semantics for classical propositional logic. We begin by m...
International audienceIn this paper, we study Boolean BI Logic (BBI) from a semantic perspective. Th...
International audienceAlong the lines of Abramsky's "Proofs-as-Processes" program, we present an int...
Bi-Intuitionistic Linear Logic (BILL) is an extension of Intuitionistic Linear Logic with a par, dua...