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Fuzzy Conditional Inference and Reasoning for Fuzzy Granular Propositions using Two Fold Fuzzy Logic

EasyChair Preprint 3552, version 2

Versions: 12history
16 pagesDate: November 15, 2022

Abstract

Zadeh defined fuzzy Sets       for Uncertain Information with single Fuzzy membershipfunction A = µA(x ), where A is Fuzzy Set and x Є X. In this paper, the Fuzzy set is defined by A= { µABelief(x), µ ADisbelief(x)} with the two Fuzzy membership functionsbased on Belief and Disbelief. The Fuzzy Set with two Fuzzy membership functions will give more evidence to fuzzy information. Fuzzy Logic and Fuzzy inference are sproposed based on the two fuzzy membership functions. In this paper, the fuzzy conditional inference for “ if … then …” and “if … then … else” is also proposed with two fuzzy membership functions. Fuzzy Certainty Factor is defined with the difference of Belief Fuzzy Membership Function and Disbelief Fuzzy Membership Function to elinate the conflict of evidence in Uncertain Information

Keyphrases: Fuzzy Logic, Fuzzy membership functions, fuzzy inference, fuzzy modulations

BibTeX entry
BibTeX does not have the right entry for preprints. This is a hack for producing the correct reference:
@booklet{EasyChair:3552,
  author    = {Venkata Subba Reddy Poli},
  title     = {Fuzzy Conditional Inference and Reasoning for Fuzzy Granular Propositions using Two Fold Fuzzy Logic},
  howpublished = {EasyChair Preprint 3552},
  year      = {EasyChair, 2022}}
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