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On Minimal Fuzzy Realization in Category Theoretic Setting

Author

Listed:
  • Shailendra Singh

    (Department of Mathematics & Computing, Indian Institute of Technology (ISM), Dhanbad 826004, India)

  • Amarjit Kaur Sahni

    (Department of Mathematics, AIAS, Amity University, UP, India)

  • Jayanti Tripathi Pandey

    (Department of Mathematics, AIAS, Amity University, UP, India)

Abstract

This paper aims to study the minimal fuzzy realization for a fuzzy language with membership values in a complete residuated lattice by using category theory. Specifically, we introduce the concept of a category 𠒞𠒯ℛℒ(Σ), whose object-class is complete transition residuated lattices corresponding to deterministic Σ-semiautomata. We give the categorical characterization of reachability and observability maps for a given deterministic fuzzy automaton. In another direction, we demonstrate that the category 𠒟𠒮𠒜(Σ) is a subcategory of the categories ℱ𠒞𠒜(Σ) of F1-coalgebras and ℱ𠒟𠒜(Σ) of (F2,F3)-dialgebras. Also, we discuss the concept of bisimulation between F1-coalgebras. Next, we introduce a general theory of minimal fuzzy realization for a given fuzzy language in a category theory setting. Strikingly, we demonstrate that all minimal fuzzy realization for a given fuzzy language is one of a kind up to isomorphism.

Suggested Citation

  • Shailendra Singh & Amarjit Kaur Sahni & Jayanti Tripathi Pandey, 2022. "On Minimal Fuzzy Realization in Category Theoretic Setting," New Mathematics and Natural Computation (NMNC), World Scientific Publishing Co. Pte. Ltd., vol. 18(03), pages 889-917, November.
  • Handle: RePEc:wsi:nmncxx:v:18:y:2022:i:03:n:s1793005722500429
    DOI: 10.1142/S1793005722500429
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