Decidability, partial decidability and sharpness relation for l-subsets

Studia Logica 46 (3):227-238 (1987)
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Abstract

If X is set and L a lattice, then an L-subset or fuzzy subset of X is any map from X to L, [11]. In this paper we extend some notions of recursivity theory to fuzzy set theory, in particular we define and examine the concept of almost decidability for L-subsets. Moreover, we examine the relationship between imprecision and decidability. Namely, we prove that there exist infinitely indeterminate L-subsets with no more precise decidable versions and classical subsets whose unique shaded decidable versions are the L-subsets almost-everywhere indeterminate

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10.1007/bf00372547

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Citations of this work

Effectiveness and Multivalued Logics.Giangiacomo Gerla - 2006 - Journal of Symbolic Logic 71 (1):137 - 162.

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References found in this work

Fuzzy Sets.Lofti A. Zadeh - 1965 - Information and Control 8 (1):338--53.
Fuzzy recursion, ret's, and isols.Leon Harkleroad - 1984 - Zeitschrift fur mathematische Logik und Grundlagen der Mathematik 30 (26‐29):425-436.
Fuzzy Recursion, Ret's, And Isols.Leon Harkleroad - 1984 - Mathematical Logic Quarterly 30 (26-29):425-436.

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