Add to ORKGThe implication relationship between subsystems in Reverse Mathematics has an underlying logic, which can be used to deduce certain new Reverse Mathematics results from existing ones in a routine way. We use techniques of modal logic to formalize the logic of Reverse Mathematics into a system that we name s-logic. We argue that s-logic captures precisely the logical content of the implication and nonimplication relations between subsystems in Reverse Mathematics. We present a sound, complete, decidable, and compact tableau-style deductive system for s-logic, and explore in detail two fragments that are particularly relevant to Reverse Mathematics practice and automated theorem proving of Reverse Mathematics results
In this work, the problem of performing abduction in modal logics is addressed, along the lines of [...
AbstractThis paper concerns the question of automated deduction methods for modal logic. A method, c...
Reversible systems feature both forward computations and backward computations, where the latter und...
The goal of reverse mathematics is to study the implication and non-implication relationships betwee...
Building on previous work by Mummert, Saadaoui and Sovine, we study the logic underlying the web of ...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
ISBN 2-87892-009-0International audienceMethods for automated deduction for non classical logics can...
This book presents reverse mathematics to a general mathematical audience for the first time. Revers...
We investigate the semantics of the logical systems obtained by introducing the modalities 2 and 3 i...
Reverse mathematics studies which subsystems of second order arithmetic are equivalent to key theore...
AbstractThis paper explains new results relating modal propositional logic and rewrite rule systems....
Contents: List of Figures. List of Tables. Acknowledgments. 1. Introduction. Part I: Labelled deduct...
International audienceReverse mathematics is a new field that seeks to find the axioms needed to pro...
1 This paper is a continuation of the investigations reported in Corcoran and Weaver [1] where two l...
Abstract. We show that each of the five basic theories of second order arithmetic that play a centra...
In this work, the problem of performing abduction in modal logics is addressed, along the lines of [...
AbstractThis paper concerns the question of automated deduction methods for modal logic. A method, c...
Reversible systems feature both forward computations and backward computations, where the latter und...
The goal of reverse mathematics is to study the implication and non-implication relationships betwee...
Building on previous work by Mummert, Saadaoui and Sovine, we study the logic underlying the web of ...
Reverse Mathematics seeks to find the minimal set existence or comprehension axioms needed to prove ...
ISBN 2-87892-009-0International audienceMethods for automated deduction for non classical logics can...
This book presents reverse mathematics to a general mathematical audience for the first time. Revers...
We investigate the semantics of the logical systems obtained by introducing the modalities 2 and 3 i...
Reverse mathematics studies which subsystems of second order arithmetic are equivalent to key theore...
AbstractThis paper explains new results relating modal propositional logic and rewrite rule systems....
Contents: List of Figures. List of Tables. Acknowledgments. 1. Introduction. Part I: Labelled deduct...
International audienceReverse mathematics is a new field that seeks to find the axioms needed to pro...
1 This paper is a continuation of the investigations reported in Corcoran and Weaver [1] where two l...
Abstract. We show that each of the five basic theories of second order arithmetic that play a centra...
In this work, the problem of performing abduction in modal logics is addressed, along the lines of [...
AbstractThis paper concerns the question of automated deduction methods for modal logic. A method, c...
Reversible systems feature both forward computations and backward computations, where the latter und...