International audienceThe main part of a classical combinatorial proof is a skew fi-bration, which precisely captures the behavior of weakening and contraction. Relaxing the presence of these two rules leads to certain substruc-tural logics and substructural proof theory. In this paper we investigate what happens if we replace the skew fibration by other kinds of graph homomorphism. This leads us to new logics and proof systems that we call combinatorial
International audienceWe present Intuitionistic Combinatorial Proofs (ICPs), a concrete geometric se...
International audienceIn this paper we present a proof system that operates on graphs instead of for...
AbstractIn [13] Parikh proved the first mathematical result about concrete consistency of contradict...
International audienceThe main part of a classical combinatorial proof is a skew fi-bration, which p...
International audienceHughes' combinatorial proofs give canonical representations for classical logi...
International audienceIn this paper we extend Hughes’ combinatorial proofs to modal logics. The cruc...
International audienceThis paper introduces combinatorial flows that generalize combinatorial proofs...
AbstractCombinatorial proofs are abstract invariants for sequent calculus proofs, similarly to homot...
École thématiqueThese are the slides and lecture notes for a 5x90min course given online via Zoom at...
In this thesis we investigate certain structural refinements of multiplicative linear logic, obtaine...
AbstractProofs Without Syntax [Hughes, D.J.D. Proofs Without Syntax. Annals of Mathematics 2006 (to ...
This paper introduces the notion of combinatorial flows as a generalization of combinatorial proofs ...
Proofs are traditionally syntactic, inductively generated objects. This paper presents an abstract m...
International audienceWe uncover a close relationship between combinatorial and syntactic proofs for...
International audienceIn this paper we present a proof system that operates on graphs instead of for...
International audienceWe present Intuitionistic Combinatorial Proofs (ICPs), a concrete geometric se...
International audienceIn this paper we present a proof system that operates on graphs instead of for...
AbstractIn [13] Parikh proved the first mathematical result about concrete consistency of contradict...
International audienceThe main part of a classical combinatorial proof is a skew fi-bration, which p...
International audienceHughes' combinatorial proofs give canonical representations for classical logi...
International audienceIn this paper we extend Hughes’ combinatorial proofs to modal logics. The cruc...
International audienceThis paper introduces combinatorial flows that generalize combinatorial proofs...
AbstractCombinatorial proofs are abstract invariants for sequent calculus proofs, similarly to homot...
École thématiqueThese are the slides and lecture notes for a 5x90min course given online via Zoom at...
In this thesis we investigate certain structural refinements of multiplicative linear logic, obtaine...
AbstractProofs Without Syntax [Hughes, D.J.D. Proofs Without Syntax. Annals of Mathematics 2006 (to ...
This paper introduces the notion of combinatorial flows as a generalization of combinatorial proofs ...
Proofs are traditionally syntactic, inductively generated objects. This paper presents an abstract m...
International audienceWe uncover a close relationship between combinatorial and syntactic proofs for...
International audienceIn this paper we present a proof system that operates on graphs instead of for...
International audienceWe present Intuitionistic Combinatorial Proofs (ICPs), a concrete geometric se...
International audienceIn this paper we present a proof system that operates on graphs instead of for...
AbstractIn [13] Parikh proved the first mathematical result about concrete consistency of contradict...