Your search keyword '"Palmigiano, Alessandra"' showing total 13 results

1. Unified correspondence as a proof-theoretic tool.

Author

Greco, Giuseppe, Ma, Minghui, Palmigiano, Alessandra, Tzimoulis, Apostolos, and Zhao, Zhiguang

Subjects

DISTRIBUTIVE lattices, CORRESPONDENCE theory of truth, EPISTEMIC logic, ALGORITHMS

Abstract

The present article aims at establishing formal connections between correspondence phenomena, well known from the area of modal logic, and the theory of display calculi, originated by Belnap. These connections have been seminally observed and exploited by Marcus Kracht, in the context of his characterization of the modal axioms (which he calls primitive formulas) which can be effectively transformed into 'analytic' structural rules of display calculi. In this context, a rule is 'analytic' if adding it to a display calculus preserves Belnap's cut-elimination theorem. In recent years, the state-of-the-art in correspondence theory has been uniformly extended from classical modal logic to diverse families of non-classical logics, ranging from (bi-)intuitionistic (modal) logics, linear, relevant and other substructural logics, to hybrid logics and mu-calculi. This generalization has given rise to a theory called unified correspondence, the most important technical tools of which are the algorithm ALBA, and the syntactic characterization of Sahlqvist-type classes of formulas and inequalities which is uniform in the setting of normal DLE-logics (logics the algebraic semantics of which is based on bounded distributive lattices). We apply unified correspondence theory, with its tools and insights, to extend Kracht's results and prove his claims in the setting of DLE-logics. The results of the present article characterize the space of properly displayable DLE-logics. [ABSTRACT FROM AUTHOR]

Published

2018

2. Sahlqvist theory for impossible worlds.

Author

PALMIGIANO, ALESSANDRA, SOURABH, SUMIT, and ZHIGUANG ZHAO

Subjects

CORRESPONDENCE analysis (Statistics), MODAL logic, KRIPKE semantics, ALGEBRA, DEONTIC logic

Abstract

We extend unified correspondence theory to Kripke frames with impossible worlds and their associated regular modal logics. These are logics the modal connectives of which are not required to be normal: only the weaker properties of additivity ◇x∨◇y=◇(x∨y) and multiplicativity □x∧□y=□(x∧y) are required. Conceptually, it has been argued that their lacking necessitation makes regular modal logics better suited than normal modal logics at the formalization of epistemic and deontic settings. From a technical viewpoint, regularity proves to be very natural and adequate for the treatment of algebraic canonicity Jónsson-style. Indeed, additivity and multiplicativity turn out to be key to extend Jónsson's original proof of canonicity to the full Sahlqvist class of certain regular distributive modal logics naturally generalizing distributive modal logic. Most interestingly, additivity and multiplicativity are key to Jónsson-style canonicity also in the original (i.e. normal) DML. Our contributions include: the definition of Sahlqvist inequalities for regular modal logics on a distributive lattice propositional base; the proof of their canonicity following Jónsson's strategy; the adaptation of the algorithm ALBA to the setting of regular modal logics on two non-classical (distributive lattice and intuitionistic) bases; the proof that the adapted ALBA is guaranteed to succeed on a syntactically defined class which properly includes the Sahlqvist one; finally, the application of the previous results so as to obtain proofs, alternative to Kripke's, of the strong completeness of Lemmon's epistemic logics E2-E5 with respect to elementary classes of Kripke frames with impossible worlds. [ABSTRACT FROM AUTHOR]

Published

2017

3. Jónsson-style canonicity for ALBA-inequalities.

Author

PALMIGIANO, ALESSANDRA, SOURABH, SUMIT, and ZHIGUANG ZHAO

Subjects

MATHEMATICAL inequalities, CANONICAL coordinates, MAPS, DISTRIBUTIVE law (Mathematics), ALGORITHMS

Abstract

The theory of canonical extensions typically considers extensions of maps A→B to maps Aδ→Bδ. In the present article, the theory of canonical extensions of maps A→Bδ to maps Aδ→Bδ is developed, and is applied to obtain a new canonicity proof for those inequalities in the language of Distributive Modal Logic (DML) on which the algorithm ALBA [9] is successful. [ABSTRACT FROM AUTHOR]

Published

2017

4. Dual characterizations for finite lattices via correspondence theory for monotone modal logic.

Author

FRITTELLA, SABINE, PALMIGIANO, ALESSANDRA, and SANTOCANALE, LUIGI

Subjects

LATTICE theory, FINITE element method, MODAL logic, ALGORITHMS, LOGIC

Abstract

We establish a formal connection between algorithmic correspondence theory and certain dual characterization results for finite lattices, similar to Nation's characterization of a hierarchy of pseudovarieties of finite lattices, progressively generalizing finite distributive lattices. This formal connection is mediated through monotone modal logic. Indeed, we adapt the correspondence algorithm ALBA to the setting of monotone modal logic, and we use a certain duality-induced encoding of finite lattices as monotone neighbourhood frames to translate lattice terms into formulas in monotone modal logic. [ABSTRACT FROM AUTHOR]

Published

2017

5. Multi-type display calculus for propositional dynamic logic.

Author

FRITTELLA, SABINE, GRECO, GIUSEPPE, KURZ, ALEXANDER, and PALMIGIANO, ALESSANDRA

Subjects

CALCULUS, EPISTEMIC logic, PROOF theory, SEMANTICS (Philosophy), ENCODING, AXIOMS

Abstract

We introduce a multi-type display calculus for Propositional Dynamic Logic (PDL). This calculus is complete w.r.t. PDL, and enjoys Belnap-style cut-elimination and subformula property. [ABSTRACT FROM AUTHOR]

Published

2016

6. Multi-type display calculus for dynamic epistemic logic.

Author

FRITTELLA, SABINE, GRECO, GIUSEPPE, KURZ, ALEXANDER, PALMIGIANO, ALESSANDRA, and SIKIMIĆ, VLASTA

Subjects

EPISTEMIC logic, SEMANTICS (Philosophy), CALCULUS, NONCLASSICAL mathematical logic, COMPUTATIONAL complexity

Abstract

In the present article, we introduce a multi-type display calculus for dynamic epistemic logic, which we refer to as Dynamic Calculus. The display approach is suitable to modularly chart the space of dynamic epistemic logics on weaker-than-classical propositional base. The presence of types endows the language of the Dynamic Calculus with additional expressivity, allows for a smooth proof-theoretic treatment, and paves the way towards a general methodology for the design of proof systems for the generality of dynamic logics, and certainly beyond dynamic epistemic logic. We prove that the Dynamic Calculus adequately captures Baltag-Moss-Solecki's dynamic epistemic logic, and enjoys Belnap-style cut elimination [ABSTRACT FROM AUTHOR]

Published

2016

7. A proof-theoretic semantic analysis of dynamic epistemic logic.

Author

FRITTELLA, SABINE, GRECO, GIUSEPPE, KURZ, ALEXANDER, PALMIGIANO, ALESSANDRA, and SIKIMIĆ, VLASTA

Subjects

EPISTEMIC logic, SEMANTICS (Philosophy), STRUCTURAL proof theory, GAME theory, CALCULUS

Abstract

The present article provides an analysis of the existing proof systems for dynamic epistemic logic from the viewpoint of proof-theoretic semantics. Dynamic epistemic logic is one of the best known members of a family of logical systems that have been successfully applied to diverse scientific disciplines, but the proof-theoretic treatment of which presents many difficulties. After an illustration of the proof-theoretic semantic principles most relevant to the treatment of logical connectives, we turn to illustrating the main features of display calculi, a proof-theoretic paradigm that has been successfully employed to give a proof-theoretic semantic account of modal and substructural logics. Then, we review some of the most significant proposals of proof systems for dynamic epistemic logics, and we critically reflect on them in the light of the previously introduced prooftheoretic semantic principles. The contributions of the present article include a generalization of Belnap's cut-elimination metatheorem for display calculi, and a revised version of the display-style calculus D.EAK [30]. We verify that the revised version satisfies the previously mentioned proof-theoretic semantic principles, and show that it enjoys cut-elimination as a consequence of the generalized metatheorem. [ABSTRACT FROM AUTHOR]

Published

2016

8. Coalgebra and Logic: A Brief Overview.

Author

KURZ, ALEXANDER, PALMIGIANO, ALESSANDRA, and VENEMA, YDE

Subjects

ALGEBRA, MODAL logic

Abstract

The article presents an introduction to this issue special issue of the "Journal of Logic and Computation," including a discussion on coalgebra and modal logic and an overview of the articles on these subjects.

Published

2010

9. Categories: How I Learned to Stop Worrying and Love Two Sorts.

Author

Conradie, Willem, Frittella, Sabine, Palmigiano, Alessandra, Piazzai, Michele, Tzimoulis, Apostolos, and Wijnberg, Nachoem M.

Subjects

FRITTELLA, Sabine, CONRADIE, Willem, PALMIGIAN, Alessandra

Abstract

The article discusses the conference talks concerning "Categories: How I Learned to Stop Worrying and Love Two Sorts" by math experts including Willem Conradie, Sabine Frittella and Alessandra Palmigian.

Published

2017

10. Proof systems for the logics for social behaviour.

Author

Palmigiano, Alessandra

Subjects

INTERPERSONAL relations, LOGIC

Abstract

The article discusses the conference talks concerning "Proof systems for the logics for social behaviour" by Alessandra Palmigiano.

Published

2017

11. Sahlqvist Correspondence via Duality and its Applications.

Author

Palmigiano, Alessandra

Subjects

CORRESPONDENCE analysis (Statistics), DUALITY (Logic), ALGEBRA, TOPOLOGY, MODAL logic, CALCULUS

Abstract

The article discusses the unified correspondence approach which has imported techniques from duality, algebra and formal topology that has been used by modal logicians. It states that the approach has exported the state of the art of correspondence theory of a wide range of logics including the normal and non-normal modal logics, hybrid logics and mu-calculus.

Published

2017

12. Editorial.

Author

CONRADIE, WILLEM and PALMIGIANO, ALESSANDRA

Subjects

LATTICE theory, MODAL logic

Abstract

The article discusses papers published within the issue, including "The Canonical FEP Construction, which focuses on a novel construction based on canonical extensions, "Dual Characterizations for Finite Lattices Via Correspondence Theory for Monotone Modal Logic," and "Sahlqvist Preservation for Topological Fixed-Point Logic".

Published

2017

13. A multi-type calculus for inquisitive logic.

Author

Frittella, Sabine, Greco, Giuseppe, Palmigiano, Alessandra, and Yang, Fan

Subjects

FRITTELLA, Sabine, GRECO, Giuseppe, YANG, Fan

Abstract

The article discusses the conference talks concerning "A multi-type calculus for inquisitive logic" by math experts including Sabine Frittella, Giuseppe Greco and Fan Yang.

Published

2017