International audienceWe formally prove the undecidability of entailment in intuitionistic linear logic in Coq. We reduce the Post correspondence problem (PCP) via binary stack machines and Minsky machines to intuitionistic linear logic. The reductions rely on several technically involved formalisations, amongst them a binary stack machine simulator for PCP, a verified low-level compiler for instruction-based languages and a soundness proof for intuitionistic linear logic with respect to trivial phase semantics. We exploit the computability of all functions definable in constructive type theory and thus do not have to rely on a concrete model of computation, enabling the reduction proofs to focus on correctness properties
AbstractThis paper presents a soundness and completeness proof for propositional intuitionistic calc...
We study versions of second-order bounded arithmetic where induction and comprehension formulae are ...
We study finite first-order satisfiability (FSAT) in the constructive setting of dependent type theo...
International audienceWe formally prove the undecidability of entailment in intuitionistic linear lo...
International audienceWe present an alternate undecidability proof for entailment in (intuitionistic...
Motivated by facilitating reasoning with logical meta-theory inside the Coq proof assistant, we inve...
International audienceWe formalise the undecidability of solvability of Diophantine equations, i.e. ...
International audienceWe solve the open problem of the decidability of Boolean BI logic (BBI), which...
International audienceWe solve the open problem of the decidability of Boolean BI logic (BBI), which...
AbstractRecently, Brotherston & Kanovich, and independently Larchey-Wendling & Galmiche, proved the ...
International audienceRecently, Brotherston & Kanovich, and independently Larchey-Wendling & Galmich...
Motivés par la facilitation du raisonnement sur des méta-théories logiques à l'intérieur de l'assist...
We present a constructive analysis and machine-checked synthetic approach to the theory of one-one, ...
International audienceA class of models is presented, in the form of continuation monads polymorphic...
International audienceWe formalise the undecidability of solvability of Diophantine equations, i.e. ...
AbstractThis paper presents a soundness and completeness proof for propositional intuitionistic calc...
We study versions of second-order bounded arithmetic where induction and comprehension formulae are ...
We study finite first-order satisfiability (FSAT) in the constructive setting of dependent type theo...
International audienceWe formally prove the undecidability of entailment in intuitionistic linear lo...
International audienceWe present an alternate undecidability proof for entailment in (intuitionistic...
Motivated by facilitating reasoning with logical meta-theory inside the Coq proof assistant, we inve...
International audienceWe formalise the undecidability of solvability of Diophantine equations, i.e. ...
International audienceWe solve the open problem of the decidability of Boolean BI logic (BBI), which...
International audienceWe solve the open problem of the decidability of Boolean BI logic (BBI), which...
AbstractRecently, Brotherston & Kanovich, and independently Larchey-Wendling & Galmiche, proved the ...
International audienceRecently, Brotherston & Kanovich, and independently Larchey-Wendling & Galmich...
Motivés par la facilitation du raisonnement sur des méta-théories logiques à l'intérieur de l'assist...
We present a constructive analysis and machine-checked synthetic approach to the theory of one-one, ...
International audienceA class of models is presented, in the form of continuation monads polymorphic...
International audienceWe formalise the undecidability of solvability of Diophantine equations, i.e. ...
AbstractThis paper presents a soundness and completeness proof for propositional intuitionistic calc...
We study versions of second-order bounded arithmetic where induction and comprehension formulae are ...
We study finite first-order satisfiability (FSAT) in the constructive setting of dependent type theo...