We present a framework for machine implementation of both partial and complete fragments of large families of non-classical logics such as modal, relevance, and intuitionistic logics. We decompose a logic into two interacting parts, each a natural deduction system: a base logic of labelled formulae, and a theory of labels characterizing the properties of the Kripke models. Our approach is modular and supports uniform proofs of correctness and proof normalization. We have implemented our work in the Isabelle Logical Framework
We investigate the semantics of the logical systems obtained by introducing the modalities 2 and 3 i...
In previous work we gave an approach, based on labelled natural deduction, for formalizing proof sys...
International audienceLabelled proof theory has been famously successful for modal logics by mimicki...
We present a framework for machine implementation of both partial and complete fragments of large fa...
We present a framework for machine implementation of both partial and complete fragments of large fa...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
The subject of this work is the development and investigation of a \emph{framework} for the modular ...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
Contents: List of Figures. List of Tables. Acknowledgments. 1. Introduction. Part I: Labelled deduct...
We present a theoretical and practical approach to the modular natural deduction presentation of mod...
We introduce a framework for presenting non-classical logics in a modular and uniform way as labelle...
We investigate the semantics of the logical systems obtained by introducing the modalities 2 and 3 i...
In previous work we gave an approach, based on labelled natural deduction, for formalizing proof sys...
International audienceLabelled proof theory has been famously successful for modal logics by mimicki...
We present a framework for machine implementation of both partial and complete fragments of large fa...
We present a framework for machine implementation of both partial and complete fragments of large fa...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
The subject of this work is the development and investigation of a \emph{framework} for the modular ...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
We present a framework for machine implementation of families of non-classical logics with Kripke-st...
Contents: List of Figures. List of Tables. Acknowledgments. 1. Introduction. Part I: Labelled deduct...
We present a theoretical and practical approach to the modular natural deduction presentation of mod...
We introduce a framework for presenting non-classical logics in a modular and uniform way as labelle...
We investigate the semantics of the logical systems obtained by introducing the modalities 2 and 3 i...
In previous work we gave an approach, based on labelled natural deduction, for formalizing proof sys...
International audienceLabelled proof theory has been famously successful for modal logics by mimicki...
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