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Issue:Radical structures of intuitionistic fuzzy polynomial ideals of a ring

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http://ifigenia.org/wiki/issue:nifs/24/4/85-96
Title of paper: Radical structures of intuitionistic fuzzy polynomial ideals of a ring
Author(s):
P. K. Sharma
Post Graduate Department of Mathematics, D.A.V. College, Jalandhar, Punjab, India
pksharma@davjalandhar.com
Gagandeep Kaur
Research Scholar, IKG PT University, Jalandhar, Punjab, India
taktogagan@gmail.com
Published in: Notes on Intuitionistic Fuzzy Sets, Volume 24 (2018), Number 4, pages 85–96
DOI: https://doi.org/10.7546/nifs.2018.24.4.85-96
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Abstract: In this paper we investigate the radical structure of an intuitionistic fuzzy polynomial ideal [math]\displaystyle{ A_x }[/math] induced by an intuitionistic fuzzy ideal [math]\displaystyle{ A }[/math] of a ring and study its properties. Given an intuitionistic fuzzy ideal [math]\displaystyle{ B }[/math] of a ring [math]\displaystyle{ R^{\prime} }[/math] and a homomorphism [math]\displaystyle{ f  : R \rightarrow R^{\prime} }[/math], we show that if [math]\displaystyle{ f_x : R[x] \rightarrow R^{\prime}[x] }[/math] is the induced homomorphism of [math]\displaystyle{ f }[/math], that is, [math]\displaystyle{ f_x (\sum_{i = 0}^n a_i^{x_i}) = \sum_{i = 0}^n (f(a_i)) x_i }[/math], then [math]\displaystyle{ f_x^{-1} [(\sqrt{B})_x] = (\sqrt{f^{-1}(B)})_x }[/math].
Keywords: Complex trapezoidal intuitionistic fuzzy number (CTrIFN), Trapezoidal intuitionistic fuzzy number (TrIFN).
AMS Classification: 03E72, 05C72, 05C65, 47N60.
References:
  1. Atanassov, K. T. (1999). Intuitionistic Fuzzy Sets: Theory and Applications, Physica-Verlag, Heidelberg.
  2. Parvathi, R., & Malathi, C. (2012). Arithmetic operations on symmetric trapezoidal intuitionistic fuzzy numbers, International Journal of Soft Computing and Engineering, 2(2), 268–273.
  3. Buckley, J. J. (1989). Fuzzy complex numbers, Fuzzy Sets and Systems, 33, 333–345.
  4. Beaula, T., & Priyadharsini, M. (2015). Operations on intuitionistic trapezoidal fuzzy numbers using interval arithmetic, Int. J. of Fuzzy Mathematical Archive, 9(1), 125–133.
  5. Moore, R. E. (1996). Interval Analysis, Prentice Hall, India.
  6. Burillo, P., Bustince, H., & Mohedano, V. (1994). Some definition of intuitionistic fuzzy number, Fuzzy Based Expert Systems, Sofia, Bulgaria, 1994, 28–30.
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