International audienceThe standard proof theory for logics with equality and fixpoints suffers from limitations of the sequent calculus, where reasoning is separated from computational tasks such as unification or rewriting. We propose in this paper an extension of the calculus of structures, a deep inference formalism, that supports incremental and contextual reasoning with equality and fixpoints in the setting of linear logic. This system allows deductive and computational steps to mix freely in a continuum which integrates smoothly into the usual versatile rules of multiplicative-additive linear logic in deep inference
International audienceSystem NEL is the mixed commutative/non-commutative linear logic BV augmented ...
International audienceThis paper is part of a general project of developing a sys- tematic and algeb...
We use µMALL, the logic that results from adding least and greatest fixed points to first-order mult...
International audienceThe standard proof theory for logics with equality and fixpoints suffers from ...
The calculus of structures is a new proof theoretical formalism, introduced by myself in 1999 and in...
This paper studies properties of the logic BV, which is an extension of multiplicative linear logic ...
Deep inference is a proof theoretic methodology that generalizes the standardnotion of inference of ...
The calculus of structures is a proof theoretical formalism which generalizes the sequent calculus w...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
ISSN 1430-211XThe calculus of structures is a proof theoretical formalism which generalizes sequent ...
This thesis investigates the use of deep inference formalisms as basis for a computational interpret...
In this thesis we see deductive systems for classical propositional and predicate logic which use de...
This thesis studies the design of deep-inference deductive systems. In the systems with deep inferen...
International audienceWe present two proof systems for implication-only intuitionistic logic in the ...
International audienceSystem NEL is the mixed commutative/non-commutative linear logic BV augmented ...
International audienceThis paper is part of a general project of developing a sys- tematic and algeb...
We use µMALL, the logic that results from adding least and greatest fixed points to first-order mult...
International audienceThe standard proof theory for logics with equality and fixpoints suffers from ...
The calculus of structures is a new proof theoretical formalism, introduced by myself in 1999 and in...
This paper studies properties of the logic BV, which is an extension of multiplicative linear logic ...
Deep inference is a proof theoretic methodology that generalizes the standardnotion of inference of ...
The calculus of structures is a proof theoretical formalism which generalizes the sequent calculus w...
In this thesis I study several deductive systems for linear logic, its fragments, and some noncommut...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
ISSN 1430-211XThe calculus of structures is a proof theoretical formalism which generalizes sequent ...
This thesis investigates the use of deep inference formalisms as basis for a computational interpret...
In this thesis we see deductive systems for classical propositional and predicate logic which use de...
This thesis studies the design of deep-inference deductive systems. In the systems with deep inferen...
International audienceWe present two proof systems for implication-only intuitionistic logic in the ...
International audienceSystem NEL is the mixed commutative/non-commutative linear logic BV augmented ...
International audienceThis paper is part of a general project of developing a sys- tematic and algeb...
We use µMALL, the logic that results from adding least and greatest fixed points to first-order mult...