Arithmetic Behaviors of P-Norm Generalized Trapezoidal Intuitionistic Fuzzy Numbers with Application to Circuit Analysis

P-norm Generalized Trapezoidal Intuitionistic Fuzzy Number is the most generalized form of Fuzzy as well as Intuitionistic Fuzzy Number. It has a huge application while solving various problems in imprecise environment. In this paper the authors have discussed some basic arithmetic operations of p-norm Generalized Trapezoidal Intuitionistic Fuzzy Numbers using two different methods (extension principle method and vertex method) and have solved a problem of circuit analysis taking the given data as p-norm Generalized Trapezoidal Intuitionistic Fuzzy Numbers.

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Year of publication:	2017
Authors:	Banerjee, Sanhita ; Roy, Tapan Kumar
Published in:	International Journal of Fuzzy System Applications (IJFSA). - IGI Global, ISSN 2156-1761, ZDB-ID 2703297-8. - Vol. 6.2017, 3 (01.07.), p. 6-58
Publisher:	IGI Global
Subject:	Circuit Analysis \| Generalized Trapezoidal Intuitionistic Fuzzy Number (GTrIFN) \| Intuitionistic Fuzzy Number (IFN) \| P-Norm Generalized Trapezoidal Intuitionistic Fuzzy Number [(GTrIFN)p] \| Vertex Method

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Type of publication:	Article
Language:	English
Other identifiers:	10.4018/IJFSA.2017070102 [DOI]
Source:	Other ZBW resources

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