International audienceIn usual proof systems, like the sequent calculus, only a very limited way of combining proofs is available through the tree structure. We present in this paper a logic-independent proof calculus, where proofs can be freely composed by connectives, and prove its basic properties. The main advantage of this proof calculus is that it allows to avoid certain types of syntactic bureaucracy inherent to all usual proof systems, in particular the sequent calculus. Proofs in this system closely reflect their atomic flow, which traces the behaviour of atoms through structural rules. The general definition is illustrated by the standard deep-inference system for propositional logic, for which there are known rewriting techniques...
We investigate semantics for classical proof based on the sequent calculus. We show that the proposi...
International audienceIn this paper we investigate Hughes’ combinatorial proofs as a notion of proof...
We design a proof system for propositional classical logic that integrates two languages for Boolean...
Abstract. In usual proof systems, like the sequent calculus, only a very limited way of combining pr...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
The goal of this article is to design a uniform proof-theoretical framework encompassing classical, ...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
AbstractCombinatorial proofs are abstract invariants for sequent calculus proofs, similarly to homot...
The calculus of structures is a new proof theoretical formalism, introduced by myself in 1999 and in...
The key to the proof-theoretic study of a logic is a proof calculus with asubformula property. Many ...
AbstractWe analyse the structure of propositional proofs in the sequent calculus focusing on the wel...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
AbstractProofs Without Syntax [Hughes, D.J.D. Proofs Without Syntax. Annals of Mathematics 2006 (to ...
AbstractWe investigate semantics for classical proof based on the sequent calculus. We show that the...
The calculus of structures is a proof theoretical formalism which generalizes the sequent calculus w...
We investigate semantics for classical proof based on the sequent calculus. We show that the proposi...
International audienceIn this paper we investigate Hughes’ combinatorial proofs as a notion of proof...
We design a proof system for propositional classical logic that integrates two languages for Boolean...
Abstract. In usual proof systems, like the sequent calculus, only a very limited way of combining pr...
In usual proof systems, like the sequent calculus, only a very limited way of combining proofs is av...
The goal of this article is to design a uniform proof-theoretical framework encompassing classical, ...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
AbstractCombinatorial proofs are abstract invariants for sequent calculus proofs, similarly to homot...
The calculus of structures is a new proof theoretical formalism, introduced by myself in 1999 and in...
The key to the proof-theoretic study of a logic is a proof calculus with asubformula property. Many ...
AbstractWe analyse the structure of propositional proofs in the sequent calculus focusing on the wel...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
AbstractProofs Without Syntax [Hughes, D.J.D. Proofs Without Syntax. Annals of Mathematics 2006 (to ...
AbstractWe investigate semantics for classical proof based on the sequent calculus. We show that the...
The calculus of structures is a proof theoretical formalism which generalizes the sequent calculus w...
We investigate semantics for classical proof based on the sequent calculus. We show that the proposi...
International audienceIn this paper we investigate Hughes’ combinatorial proofs as a notion of proof...
We design a proof system for propositional classical logic that integrates two languages for Boolean...