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A Categorical Approach to Coalgebraic Fixpoint Logic (2405.00237v1)

Published 30 Apr 2024 in cs.LO

Abstract: We define a framework for incorporating alternation-free fixpoint logics into the dual-adjunction setup for coalgebraic modal logics. We achieve this by using order-enriched categories. We give a least-solution semantics as well as an initial algebra semantics, and prove they are equivalent. We also show how to place the alternation-free coalgebraic $\mu$-calculus in this framework, as well as PDL and a logic with a probabilistic dynamic modality.

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References (29)
  1. Positive fragments of coalgebraic logics. In CALCO, volume 8089 of Lecture Notes in Computer Science, pages 51–65. Springer, 2013.
  2. Coalgebra learning via duality. In FoSSaCS, volume 11425 of Lecture Notes in Computer Science, pages 62–79. Springer, 2019.
  3. Janusz A. Brzozowski. Derivatives of regular expressions. J. ACM, 11(4):481–494, 1964.
  4. EXPTIME tableaux for the coalgebraic mu-calculus. Log. Methods Comput. Sci., 7(3), 2011.
  5. Modal logics are coalgebraic. In BCS Int. Acad. Conf, pages 128–140. British Computer Society, 2008.
  6. Constructive versions of Tarski’s fixed point theorems. Pacific Journal of Mathematics, 82(1):43 – 57, 1979.
  7. Fredrik Dahlqvist. Coalgebraic completeness-via-canonicity - principles and applications. In CMCS, volume 9608 of Lecture Notes in Computer Science, pages 174–194. Springer, 2016.
  8. A characterization theorem for the alternation-free fragment of the modal μ𝜇\mathrm{\mu}italic_μ-calculus. In LICS, pages 478–487. IEEE Computer Society, 2013.
  9. Non-iterative modal logics are coalgebraic. In AiML, pages 229–248. College Publications, 2020.
  10. Hennessy-Milner results for probabilistic PDL. In MFPS, volume 352 of Electronic Notes in Theoretical Computer Science, pages 283–304. Elsevier, 2020.
  11. Weak completeness of coalgebraic dynamic logics. In FICS, volume 191 of EPTCS, pages 90–104, 2015.
  12. Generic model checking for modal fixpoint logics in COOL-MC. In VMCAI (1), volume 14499 of Lecture Notes in Computer Science, pages 171–185. Springer, 2024.
  13. Global caching for the alternation-free μ𝜇\muitalic_μ-calculus. In CONCUR, volume 59 of LIPIcs, pages 34:1–34:15. Schloss Dagstuhl - Leibniz-Zentrum für Informatik, 2016.
  14. On observing nondeterminism and concurrency. In ICALP, volume 85 of Lecture Notes in Computer Science, pages 299–309. Springer, 1980.
  15. Max Kelly. The basic concepts of enriched category theory. Reprints in Theory and Applications of Categories [electronic only], 2005, 01 2005.
  16. Bartek Klin. Coalgebraic modal logic beyond sets. In MFPS, volume 173 of Electronic Notes in Theoretical Computer Science, pages 177–201. Elsevier, 2007.
  17. Dexter Kozen. A probabilistic PDL. J. Comput. Syst. Sci., 30(2):162–178, 1985.
  18. An elementary proof of the completness of PDL. Theor. Comput. Sci., 14:113–118, 1981.
  19. Algebraic semantics for coalgebraic logics. In CMCS, volume 106 of Electronic Notes in Theoretical Computer Science, pages 219–241. Elsevier, 2004.
  20. Coalgebraic semantics of modal logics: An overview. Theor. Comput. Sci., 412(38):5070–5094, 2011.
  21. Enriched logical connections. Appl. Categorical Struct., 21(4):349–377, 2013.
  22. A focus system for the alternation-free μ𝜇\muitalic_μ-calculus. In TABLEAUX, volume 12842 of Lecture Notes in Computer Science, pages 371–388. Springer, 2021.
  23. Testing semantics: Connecting processes and process logics. In AMAST, volume 4019 of Lecture Notes in Computer Science, pages 308–322. Springer, 2006.
  24. Structural congruence for bialgebraic semantics. J. Log. Algebraic Methods Program., 85(6):1268–1291, 2016.
  25. Steps and traces. J. Log. Comput., 31(6):1482–1525, 2021.
  26. Jan J. M. M. Rutten. Universal coalgebra: a theory of systems. Theor. Comput. Sci., 249(1):3–80, 2000.
  27. PSPACE bounds for rank-1 modal logics. ACM Trans. Comput. Log., 10(2):13:1–13:33, 2009.
  28. Flat coalgebraic fixed point logics. In CONCUR, volume 6269 of Lecture Notes in Computer Science, pages 524–538. Springer, 2010.
  29. Yde Venema. Automata and fixed point logic: A coalgebraic perspective. Inf. Comput., 204(4):637–678, 2006.

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