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

EasyChair Preprint no. 3554, version 2

Versions: 12history
16 pagesDate: November 15, 2022

Abstract

Zadeh[29]  defined fuzzy Sets for  Uncertain  Information  with  single  Fuzzy membership function on   = µA(x ), where A is Fuzzy Set and x Є X. In this paper,  the Fuzzy  set  is  defined  by A= {  µABelief(x), µADisbelief(x)}  with   the  two  Fuzzy membership functions µABelief(x), µADisbelief(x) based on Belief and Disbelief. The Fuzzy Set with two Fuzzy membership functions will give more evidence. Fuzzy Logic and Fuzzy reasoning are studied based on the two Fuzzy membership functions using the Fuzzy Modulations. Fuzzy Certainty Factor is defined with the difference of Belief Fuzzy Membership Function and Disbelief Fuzzy Membership Function to compute the conflict of evidence in Uncertain Information

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

BibTeX entry
BibTeX does not have the right entry for preprints. This is a hack for producing the correct reference:
@Booklet{EasyChair:3554,
  author = {Venkata Subba Reddy Poli},
  title = {Fuzzy Conditional Inference and Reasoning for Fuzzy Granular Propositions using Two Fold Fuzzy Logic},
  howpublished = {EasyChair Preprint no. 3554},

  year = {EasyChair, 2022}}
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