Araştırma Makalesi

On Muzzy Subsets

Cilt: 22 Sayı: 2 30 Haziran 2026
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On Muzzy Subsets

Öz

We introduce the concept of muzzy subsets as a novel generalization of fuzzy subsets aimed at refining the representation of uncertainty. Unlike fuzzy subsets, which assign membership degrees to individual elements, muzzy subsets assign subsethood degrees to subsets of a given universal set, capturing the extent to which a subset of the universe is accepted as a subset of the muzzy subset. Our study also establishes fundamental properties of muzzy subsets, explores their relationship with fuzzy subsets, and introduces a dual tool: co-muzzy (cuzzy) subsets, which represent degrees of supersethood, as well as a unified tool: bi-muzzy (buzzy) subsets, which combines the structures of both of the former two tools. Moreover, several examples are given to illustrate the practicality of muzzy subsets in modeling real-world scenarios where traditional set theories fall short.

Anahtar Kelimeler

Kaynakça

  1. [1]. Agusfrianto, FA, Al-Tahan, M, Hariri, M, Mahatma, Y. 2023. Examples of neutrohyperstructures on biological inheritance. Neutrosophic Sets and Systems; 60: 583–592. (digitalrepository.unm.edu/ nss_journal/vol60/iss1/38)
  2. [2]. Agusfrianto, FA, Fitriani, F, Mahatma, Y. 2022. Rough rings, rough subrings, and rough ideals. Journal of Fundamental Mathematics and Applications (JFMA); 5(2): 96–103. (repository.lppm.unila.ac. id/47116/)
  3. [3]. Akram, M, Shah, SMU, Al-Shamiri, MMA, Edalatpanah, SA. 2023. Extended DEA method for solving multi-objective transportation problem with Fermatean fuzzy sets. AIMS Mathematics; 8(1): 924–961. (dx.doi.org/%2010.3934/math.2023045)
  4. [4]. Alaca, C, Efe, H. 2008. On uniform continuity and Lebesgue property in intuitionistic fuzzy metric spaces. Journal of Applied Functional Analysis; 3(1).
  5. [5]. Balkı Okullu, P, Uğurlu, HH. 2024. Characterization of dual spacelike curves on dual lightlike cone Q~2 utilizing the structure function. Symmetry; 16(12): 1574. (doi.org/10.3390/sym16121574)
  6. [6]. Bayram, E, Çelik, G, Gezek, M. 2024. An advanced encryption system based on soft sets. AIMS Mathematics; 9(11): 32232–32256. (dx.doi.org/%2010.3934/math.20241547)
  7. [7]. Bozkurt, M, Durğun, Y. 2023. On subflat domains of RD-flat modules. Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistics; 72(3): 563–569. (doi.org/10. 31801/cfsuasmas.1229943)
  8. [8]. Çetin, E, Şimşek, Y, Cangül, IN. 2014. Some special finite sums related to the three-term polynomial relations and their applications. Advances in Difference Equations; 2014: 1–18. (doi.org/10.1186/ 1687-1847-2014-283)

Ayrıntılar

Birincil Dil

İngilizce

Konular

Matematiksel Mantık, Kümeler Teorisi, Kafesler ve Evrensel Cebir

Bölüm

Araştırma Makalesi

Yayımlanma Tarihi

30 Haziran 2026

Gönderilme Tarihi

9 Mayıs 2025

Kabul Tarihi

23 Nisan 2026

Yayımlandığı Sayı

Yıl 2026 Cilt: 22 Sayı: 2

Kaynak Göster

APA
Gürdal, U., Aynur Tirli, G., & Çetin, S. (2026). On Muzzy Subsets. Celal Bayar University Journal of Science, 22(2), 390-400. https://doi.org/10.18466/cbayarfbe.1695338
AMA
1.Gürdal U, Aynur Tirli G, Çetin S. On Muzzy Subsets. Celal Bayar University Journal of Science. 2026;22(2):390-400. doi:10.18466/cbayarfbe.1695338
Chicago
Gürdal, Utku, Gamze Aynur Tirli, ve Selim Çetin. 2026. “On Muzzy Subsets”. Celal Bayar University Journal of Science 22 (2): 390-400. https://doi.org/10.18466/cbayarfbe.1695338.
EndNote
Gürdal U, Aynur Tirli G, Çetin S (01 Haziran 2026) On Muzzy Subsets. Celal Bayar University Journal of Science 22 2 390–400.
IEEE
[1]U. Gürdal, G. Aynur Tirli, ve S. Çetin, “On Muzzy Subsets”, Celal Bayar University Journal of Science, c. 22, sy 2, ss. 390–400, Haz. 2026, doi: 10.18466/cbayarfbe.1695338.
ISNAD
Gürdal, Utku - Aynur Tirli, Gamze - Çetin, Selim. “On Muzzy Subsets”. Celal Bayar University Journal of Science 22/2 (01 Haziran 2026): 390-400. https://doi.org/10.18466/cbayarfbe.1695338.
JAMA
1.Gürdal U, Aynur Tirli G, Çetin S. On Muzzy Subsets. Celal Bayar University Journal of Science. 2026;22:390–400.
MLA
Gürdal, Utku, vd. “On Muzzy Subsets”. Celal Bayar University Journal of Science, c. 22, sy 2, Haziran 2026, ss. 390-0, doi:10.18466/cbayarfbe.1695338.
Vancouver
1.Utku Gürdal, Gamze Aynur Tirli, Selim Çetin. On Muzzy Subsets. Celal Bayar University Journal of Science. 01 Haziran 2026;22(2):390-40. doi:10.18466/cbayarfbe.1695338