Proof-theoretic Analysis of Modal Logics

Objectif

The PAnaMoL project aims at systematising proof theory for modal
logics. We intend to provide a unified perspective on sequent-style
calculi and a deeper understanding of the general connections between
axiom systems and sequent-style calculi for such logics. In detail
the research objectives are

- The systematic development of suitable syntactic characterisations
of classes of modal axioms corresponding to natural formats of rules
in different sequent-style frameworks (e.g. sequent, hypersequent,
nested sequent or display calculi) including algorithmic translations
from axioms to rules and back.

- A systematic comparison of the different sequent-style frameworks
according to their expressive strength.

- The exploitation of these results in the investigation of:
classification results stating necessary and sufficient
proof-theoretic strength for important examples of logics such as GL
and S5; uniform decidability and complexity results for large classes
of logics; general consistency proofs.

The research conducted in the project will be of relevance to
researchers in all fields where modal logics are used to model complex
phenomena and provide easy-to-use results and methods for the
proof-theoretic investigation and implementation of newly developed
modal logics.

Champ scientifique

• social scienceseconomics and businesseconomics
• natural sciencesmathematicspure mathematicsdiscrete mathematicsmathematical logic
• natural sciencescomputer and information sciencescomputational science
• humanitiesphilosophy, ethics and religionphilosophy

Programme(s)

• H2020-EU.1.3. - EXCELLENT SCIENCE - Marie Skłodowska-Curie Actions Main Programme
• H2020-EU.1.3.2. - Nurturing excellence by means of cross-border and cross-sector mobility

Thème(s)

• MSCA-IF-2014-EF - Marie Skłodowska-Curie Individual Fellowships (IF-EF)

Appel à propositions

H2020-MSCA-IF-2014

Régime de financement

Coordinateur