Adriana Balan scite author profile

Positive Fragments of Coalgebraic Logics

Balan

¹

,

Kurz

²

,

Velebil

³

2013

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Abstract. Positive modal logic was introduced in an influential 1995 paper of Dunn as the positive fragment of standard modal logic. His completeness result consists of an axiomatization that derives all modal formulas that are valid on all Kripke frames and are built only from atomic propositions, conjunction, disjunction, box and diamond.In this paper, we provide a coalgebraic analysis of this theorem, which not only gives a conceptual proof based on duality theory, but also generalizes Dunn's result from Kripke frames to coalgebras for weak-pullback preserving functors.To facilitate this analysis we prove a number of category theoretic results on functors on the categories Set of sets and Pos of posets:Every functor Set → Pos has a Pos-enriched left Kan extension Pos → Pos. Functors arising in this way are said to have a presentation in discrete arities. In the case that Set → Pos is actually Set-valued, we call the corresponding left Kan extension Pos → Pos its posetification.A set functor preserves weak pullbacks if and only if its posetification preserves exact squares. A Pos-functor with a presentation in discrete arities preserves surjections.The inclusion Set → Pos is dense. A functor Pos → Pos has a presentation in discrete arities if and only if it preserves coinserters of 'truncated nerves of posets'. A functor Pos → Pos is a posetification if and only if it preserves coinserters of truncated nerves of posets and discrete posets.A locally monotone endofunctor of an ordered variety has a presentation by monotone operations and equations if and only if it preserves Pos-enriched sifted colimits. ACM CCS: [Theory of computation]:Logic.

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Finitary Functors: From Set to Preord and Poset

Balan

¹

,

Kurz

²

2011

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On coalgebras over algebras

Balan

¹

,

Kurz

²

2011

Theoretical Computer Science

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Positive fragments of coalgebraic logics

Balan¹,

Kurz²,

Velebil³

2015

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Abstract. Positive modal logic was introduced in an influential 1995 paper of Dunn as the positive fragment of standard modal logic. His completeness result consists of an axiomatization that derives all modal formulas that are valid on all Kripke frames and are built only from atomic propositions, conjunction, disjunction, box and diamond.In this paper, we provide a coalgebraic analysis of this theorem, which not only gives a conceptual proof based on duality theory, but also generalizes Dunn's result from Kripke frames to coalgebras for weak-pullback preserving functors.To facilitate this analysis we prove a number of category theoretic results on functors on the categories Set of sets and Pos of posets:Every functor Set → Pos has a Pos-enriched left Kan extension Pos → Pos. Functors arising in this way are said to have a presentation in discrete arities. In the case that Set → Pos is actually Set-valued, we call the corresponding left Kan extension Pos → Pos its posetification.A set functor preserves weak pullbacks if and only if its posetification preserves exact squares. A Pos-functor with a presentation in discrete arities preserves surjections.The inclusion Set → Pos is dense. A functor Pos → Pos has a presentation in discrete arities if and only if it preserves coinserters of 'truncated nerves of posets'. A functor Pos → Pos is a posetification if and only if it preserves coinserters of truncated nerves of posets and discrete posets.A locally monotone endofunctor of an ordered variety has a presentation by monotone operations and equations if and only if it preserves Pos-enriched sifted colimits. ACM CCS: [Theory of computation]:Logic.

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Galois Extensions for Coquasi-Hopf Algebras

Balan

¹

2010

Communications in Algebra

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The notions of Galois and cleft extensions are generalized for coquasi-Hopf algebras. It is shown that such an extension over a coquasi-Hopf algebra is cleft if and only if it is Galois and has the normal basis property. A Schneider type theorem ([33]) is proven for coquasi-Hopf algebras with bijective antipode. As an application, we generalize Schauenburg's bialgebroid construction for coquasi-Hopf algebras.

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Adriana Balan

Positive Fragments of Coalgebraic Logics

Finitary Functors: From Set to Preord and Poset

On coalgebras over algebras

Positive fragments of coalgebraic logics

Galois Extensions for Coquasi-Hopf Algebras

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