AbstractWe investigate semantics for classical proof based on the sequent calculus. We show that the propositional connectives are not quite well-behaved from a traditional categorical perspective, and give a more refined, but necessarily complex, analysis of how connectives may be characterised abstractly. Finally we explain the consequences of insisting on more familiar categorical behaviour
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
Commencée en Septembre 2003.At the heart of the connections between Proof Theory and Type Theory, th...
We investigate semantics for classical proof based on the sequent calculus. We show that the proposi...
AbstractWe investigate semantics for classical proof based on the sequent calculus. We show that the...
Remarks by the first author: This four-hand work, praised by a referee as a breakthrough in the prob...
AbstractIt is well-known that weakening and contraction cause naïve categorical models of the classi...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
Classical logic and more precisely classical sequent calculi are currently the subject of several st...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
International audienceThis paper is an informal (and nonexhaustive) overview over some existing noti...
In this paper we give a strong normalization proof for a set of reduction rules for classical logic....
pages 246--261We present a class of objects that denote proofs in classical propositional logic. The...
Carnap’s result about classical proof-theories not ruling out non-normal valuations of propositional...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
Commencée en Septembre 2003.At the heart of the connections between Proof Theory and Type Theory, th...
We investigate semantics for classical proof based on the sequent calculus. We show that the proposi...
AbstractWe investigate semantics for classical proof based on the sequent calculus. We show that the...
Remarks by the first author: This four-hand work, praised by a referee as a breakthrough in the prob...
AbstractIt is well-known that weakening and contraction cause naïve categorical models of the classi...
In earlier articles we have introduced truth table natural deduction which allows one to extract nat...
In this thesis we use the syntactic-semantic method of constructive type theory to give meaning to c...
Classical logic and more precisely classical sequent calculi are currently the subject of several st...
AbstractThis paper proposes and studies a particular typed λ-calculus for classical linear logic. I ...
International audienceThis paper is an informal (and nonexhaustive) overview over some existing noti...
In this paper we give a strong normalization proof for a set of reduction rules for classical logic....
pages 246--261We present a class of objects that denote proofs in classical propositional logic. The...
Carnap’s result about classical proof-theories not ruling out non-normal valuations of propositional...
The sequent calculus is often criticized for requiring proofs to contain large amounts of low-level ...
Proof Theory is the result of a tumultuous history, developed on the periphery of mainstream mathema...
Commencée en Septembre 2003.At the heart of the connections between Proof Theory and Type Theory, th...