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An Efficient Model for the Approximation of Intuitionistic Fuzzy Sets in terms of Soft Relations with Applications in Decision Making

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  • Muhammad Zishan Anwar
  • Shahida Bashir
  • Muhammad Shabir

Abstract

The basic notions in rough set theory are lower and upper approximation operators defined by a fixed binary relation. This paper proposes an intuitionistic fuzzy rough set (IFRS) model which is a combination of intuitionistic fuzzy set (IFS) and rough set. We approximate an IFS by using soft binary relations instead of fixed binary relations. By using this technique, we get two pairs of intuitionistic fuzzy (IF) soft sets, called the upper approximation and lower approximation with respect to foresets and aftersets. Properties of newly defined rough set model (IFRS) are studied. Similarity relations between IFS with respect to this rough set model (IFRS) are also studied. Finally, an algorithm is constructed depending on these approximations of IFSs and score function for decision-making problems, although a method of decision-making algorithm has been introduced for fuzzy sets already. But, this new IFRS model is more accurate to solve the problem because IFS has degree of nonmembership and degree of hesitant.

Suggested Citation

  • Muhammad Zishan Anwar & Shahida Bashir & Muhammad Shabir, 2021. "An Efficient Model for the Approximation of Intuitionistic Fuzzy Sets in terms of Soft Relations with Applications in Decision Making," Mathematical Problems in Engineering, Hindawi, vol. 2021, pages 1-19, October.
  • Handle: RePEc:hin:jnlmpe:6238481
    DOI: 10.1155/2021/6238481
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    Cited by:

    1. Muhammad Zishan Anwar & Ahmad N. Al-Kenani & Shahida Bashir & Muhammad Shabir, 2022. "Pessimistic Multigranulation Rough Set of Intuitionistic Fuzzy Sets Based on Soft Relations," Mathematics, MDPI, vol. 10(5), pages 1-23, February.
    2. Muhammad Zishan Anwar & Shahida Bashir & Muhammad Shabir & Majed G. Alharbi, 2021. "Multigranulation Roughness of Intuitionistic Fuzzy Sets by Soft Relations and Their Applications in Decision Making," Mathematics, MDPI, vol. 9(20), pages 1-22, October.

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