Unambiguous acceptance of thin coalgebras
Unambiguous acceptance of thin coalgebras
Automata admitting at most one accepting run per structure, known as unambiguous automata, find applications in ver- ification of reactive systems as they extend the class of deterministic automata whilst maintaining some of their desirable properties. In this paper, we generalise a classical construction of unambiguous automata from thin trees to thin coalgebras for analytic functors. This achieves two goals: extending the existing construction to a larger class of structures, and pro- viding conceptual clarity and parametricity to the construction by formalising it in the coalgebraic framework. As part of the construction, we link automaton acceptance of languages of thin coalgebras to language recognition via so-called coherent algebras, which were previously introduced for studying thin coalgebras. This link also allows us to establish an automata- theoretic characterisation of languages recognised by finite coherent algebras.
Chernev, Anton
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Cirstea, Corina
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Hansen, Helle Hvid
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Kupke, Clemens
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Chernev, Anton
a6d65663-9045-48f4-9e03-cf0595570ea0
Cirstea, Corina
ce5b1cf1-5329-444f-9a76-0abcc47a54ea
Hansen, Helle Hvid
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Kupke, Clemens
903c8340-ea04-43d6-aefa-e613e5a2034d
Chernev, Anton, Cirstea, Corina, Hansen, Helle Hvid and Kupke, Clemens
(2025)
Unambiguous acceptance of thin coalgebras.
41st Conference on Mathematical Foundations of Programming Semantics MFPS XLI (MFPS 2025), , Glasgow, United Kingdom.
18 - 20 Jun 2025.
17 pp
.
(In Press)
Record type:
Conference or Workshop Item
(Paper)
Abstract
Automata admitting at most one accepting run per structure, known as unambiguous automata, find applications in ver- ification of reactive systems as they extend the class of deterministic automata whilst maintaining some of their desirable properties. In this paper, we generalise a classical construction of unambiguous automata from thin trees to thin coalgebras for analytic functors. This achieves two goals: extending the existing construction to a larger class of structures, and pro- viding conceptual clarity and parametricity to the construction by formalising it in the coalgebraic framework. As part of the construction, we link automaton acceptance of languages of thin coalgebras to language recognition via so-called coherent algebras, which were previously introduced for studying thin coalgebras. This link also allows us to establish an automata- theoretic characterisation of languages recognised by finite coherent algebras.
Text
MFPS25-20
- Accepted Manuscript
More information
Accepted/In Press date: June 2025
Venue - Dates:
41st Conference on Mathematical Foundations of Programming Semantics MFPS XLI (MFPS 2025), , Glasgow, United Kingdom, 2025-06-18 - 2025-06-20
Identifiers
Local EPrints ID: 504013
URI: http://eprints.soton.ac.uk/id/eprint/504013
PURE UUID: e2720522-6d61-491f-af0b-1f9914e85276
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Date deposited: 21 Aug 2025 15:22
Last modified: 22 Aug 2025 01:52
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Contributors
Author:
Anton Chernev
Author:
Corina Cirstea
Author:
Helle Hvid Hansen
Author:
Clemens Kupke
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