In this manuscript, we consider the fuzzification of the notion PU-new ideal of PU-algebra and define the fuzzy topological terms such that fuzzy topology, τ-open fuzzy set, fuzzy neighborhood, fuzzy interior, sequence of fuzzy sets, fuzzy neighborhood system, fuzzy continuity of a function with respect to PU-new ideal of PU-algebra. We explore the new theorems and related properties of above mention notions with respect to PU-new ideal on PU-algebras. Such that for (Ⱬ, τ) to be a TSFP on Ⱬ and the set Ḟ is a fuzzy in Ⱬ and NḞ be a fuzzy neighborhood system of Ḟ then the finite intersection of elements of ‘NḞ’ is also an element of ‘NḞ’ also any fuzzy set of Ⱬ which contains an element of “NḞ” is also an element of “NḞ”. Furthermore we prove the conditions with respect to fuzzy neighborhood, convergence of a sequence of fuzzy sets, fuzzy interior set of a fuzzy set under which a fuzzy set Ḟ is τ-open. We show that how the function Ψ from (Ⱬ1,τ) to (Ⱬ2,ω) is fuzzy continuous. We prove that if Ψ is a fuzzy continuous function then for every fuzzy set Ḟ in Ⱬ1, inverse of each neighborhood of Ψ(Ḟ) is a neighborhood of a fuzzy set Ḟ.
| Published in | International Journal of Systems Science and Applied Mathematics (Volume 6, Issue 4) |
| DOI | 10.11648/j.ijssam.20210604.13 |
| Page(s) | 125-130 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
| Copyright |
Copyright © The Author(s), 2024. Published by Science Publishing Group |
PU-algebra, Fuzzy PU-new Ideal, Fuzzy Topology, Topology of Fuzzy PU-new Ideal, Fuzzy Continuity
| [1] | S. Mahmood, The Permutation Topological Spaces and their Bases, Basrah Journal of Science, University of Basrah, Vol. 32 (1), (2014), 28-42. |
| [2] | S. Mahmood, Soft Regular Generalized b-Closed Sets in Soft Topological Spaces, Journal of Linear and Topological Algebra, Vol. 03, No. 04, 2014, 195- 204. |
| [3] | S. Mahmood, Soft Sequentially Absolutely Closed Spaces, International Journal of Applications of Fuzzy Sets and Artificial Intelligence, 7 (2017), 73-92. |
| [4] | S. Mahmood, Tychonoff Spaces in Soft Setting and their Basic Properties, International Journal of Applications of Fuzzy Sets and Artificial Intelligence, 7 (2017), 93-112. |
| [5] | S. Mahmood, M. Abud Alradha, Extension Permutation Spaces with Separation Axioms in Topological Groups, American Journal of Mathematics and Statistics, 2017, 7 (5): 183-198. |
| [6] | S. Mahmood and M. Abd Ulrazaq, New Category of Soft Topological Spaces, American Journal of Computational and Applied Mathematics, 8 (1), (2018), 20-25. |
| [7] | N. M. Ali Abbas and S. Mahmood, Nαc – Open Sets and their Basic Properties in Topological Spaces, American Journal of Mathematics and Statistics, 2018, 8 (2): 50-55. |
| [8] | A. M. Al –Musawi, S. M. Khalil, M. Abd Ulrazaq, Soft (1,2)-Strongly Ope Maps in Bi-Topological Spaces, IOP Conference Series: Materials Science and Engineering, (2019). |
| [9] | N. M. Ali Abbas and S. M. Khalil, On - * a Open Sets in Topological Spaces, IOP Conference Series: Materials Science and Engineering, (2019). |
| [10] | N. M. Ali Abbas, S. M. Khalil, H. J. Sadiq, A Note on the New Closed Classes and GP-Regular Classes in Soft System, Journal of Southwest Jiaotong University, Vol 54, No 1 (2019)-01-0091-06, (DOI: 10. 3969/j. issn. 0258-2724.2019.155. |
| [11] | S. Mahmood, New category of the fuzzy d-algebras, Journal of Taibah University for Science, 12 (2), (2018), 143-149. |
| [12] | S. M. Khalil, M. Ulrazaq, S. Abdul-Ghani, A. Al-Musawi, 𝜎−Algebra and 𝜎−Baire in Fuzzy Soft Setting, Advances in Fuzzy Systems, Volume 2018, Article ID 5731682, 10 pages. |
| [13] | S. A. Abdul-Ghani, S. M. Khalil, Mayadah Abd Ulrazaq & Abu Firas Muhammad Jawad Al-Musawi, New Branch of Intuitionistic Fuzzification in Algebras with Their Applications, International Journal of Mathematics and Mathematical Sciences, Volume 2018, Article ID 5712676, 6 pages. |
| [14] | Y. Imai and K. Iseki, On axiom systems of propositional calculi XIV, Proc. Japan Academy, 42 (1966), 19-22. |
| [15] | K. Iseki, An algebra related with a propositional calculus, Proc. Japan Academy, 42 (1966), 26-29. |
| [16] | Q. P. Hu & X. Li, On BCH-algebras, Math Seminar Notes, 11 (1983), 313- 320. |
| [17] | Q. P. Hu & X. Li, On proper BCH-algebras, Math. Japonica, 30 (1985), 659-66. |
| [18] | S. Mahmood, M. A. Alradha, Soft edge ρ-algebras of the power sets, International Journal of Applications of Fuzzy Sets and Artificial Intelligence, 7 (2017), 231–243. |
| [19] | S. Mahmood, A. Muhamad, Soft BCL-algebras of the power sets, International Journal of Algebra, (2017), 329 – 341. |
| [20] | S. Mahmood, M. Alradha, Characterizations of ρ-algebra and generation permutation topological ρ-algebra using permutation in symmetric group, American Journal of Mathematics and Statistics, 7 (4), (2017), 152–159. |
| [21] | S. Mahmood, M. Abd Ulrazaq, Soft BCH-algebras of the power sets, American Journal of Mathematics and Statistics, 8 (1), (2018), 1–7. |
| [22] | S. M. Khalil and Samaher Adnan Abdul-Ghani, Soft M-Ideals and Soft SIdeals In Soft S-Algebra, IOP Conf. Series: Journal of Physics: Conf. Series 1234 (2019) 012100, doi: 10.1088/1742-6596/1234/1/012100. |
| [23] | S. M. Khalil & N. M. Ali Abbas, Characteristics of the Number of Conjugacy Classes and P-Regular Classes in Finite Symmetric Groups, IOP Conference Series: Materials Science and Engineering, (2019). |
| [24] | S. Mahmood, Obtaining the suitable k for (3+2k)- cycles, Basrah Journal of Science (A), Vol. 34 (3), 13-18, 2016. |
| [25] | S. Mahmood & F. Hameed, An algorithm for generating permutations in symmetric groups using soft spaces with general study and basic properties of permutations spaces, J Theor Appl Inform Technol, 96 (9) (2018), 2445-2457. |
| [26] | Khalil, S. M., & Abbas, N. M. A. (2020). Applications on new category of the symmetric groups. AIP Conference Proceedings, 2290 (December). |
| [27] | S. M. Khalil, S. A. Abdul-Ghan, S. A. Swadi, Characteristics of Permutation Graphs using Ambivalent and Non-Ambivalent Conjugacy Classes, Proceedings of 220th IIER International Conference, Singapore 2nd-3rd February, (2019), 7-14. |
| [28] | S. Mahmood & F. Hameed, An algorithm for generating permutation algebra using soft spaces, Journal of Taibah University for Science, 12 (3), (2018), 299-308. |
| [29] | L. A. Zadeh, Fuzzy sets, Information and Control, 8 (1965), 338-353. |
| [30] | C. L. Chang, Fuzzy topological spaces, Journal of Mathematical Analysis and Applications, 24 (1968), 182-190. |
| [31] | S. M. Khalil, Decision making using algebraic operations on soft effect matrix as new category of similarity measures and study their application in medical diagnosis problems, Journal of Intelligent & Fuzzy Systems, DOI: 10.3233/JIFS-179249, IOS Press, (2019). |
| [32] | S. Mahmood, Fuzzy Lindelof Closed Spaces and Their Operations, Journal of General Mathematics Notes, 21 (1), (2014), 28-136. |
| [33] | S. Mahmood, Dissimilarity Fuzzy Soft Points and Their Applications, Fuzzy Information and Engineering, 8 (2016), 281-294. |
| [34] | S. Mahmood, On intuitionistic fuzzy soft b-closed sets in intuitionistic fuzzy soft topological spaces, Annals of Fuzzy Mathematics and Informatics, 10 (2), (2015) 221-233. |
| [35] | S. Mahmood & Z. Al-Batat, Intuitionistic Fuzzy Soft LA- Semigroups and Intuitionistic Fuzzy Soft Ideals, International Journal of Applications of Fuzzy Sets and Artificial Intelligence, 6 (2016), 119 – 132. |
| [36] | Y. B. Jun, Fuzzy topological BCK-algebras, Math, Japonica, 38 (1993), 1059-1063. |
| [37] | J. Neggers & H. S. Kim, On d-algebras, Math. Slovaca, 49 (1999), 19-26. |
| [38] | J. Neggers, Y. B. Jun & H. S. Kim, On d-ideals in d-algebras, Math. Slovaca, 49 (3) (1999), 243–251. |
| [39] | Y. B. Jun, J. Neggers, & H. S. Kim, Fuzzy d-ideals of d -algebras, J. Fuzzy Math., 8 (2000), 123-130. |
| [40] | A. Zarandi, S. Borumand, Redefined fuzzy B–algebras. Fuzzy Optimist Decision Making., 7 (4), (2008), 373–386. |
| [41] | L. Zixin, Z. Guangji, Z. Cheng, et al., New kinds of Fuzzy ideal in BCI–algebras. Fuzzy Optimism Decision Making, 5 (2), (2006), 177–186. |
| [42] | S Keawrahun and U Leerawat. On a classification of a structure algebra: SU-Algebra. Scientia Magna 2011; 7, 69-76. |
| [43] | P. Muralikrishna and D. Vijayan. On Fuzzy SU-Ideal Topological Structure, Bulletin of the international Mathematical Virtual Institute., 8 (2018), 169-176. |
| [44] | S. M. Mostafa, M. A. Abdel Naby, A. I. Elkabany, New View Of Ideals On PU-Algebra. International Journal of Computer Aplications (0975-8887) Volume 111-No 4, February 2015. |
| [45] | S. M. Mostafa, M. A. Abdel Naby, A. I. Elkabany, Fuzzy new ideal of PU-Algebra. |
APA Style
Muhammad Shafiq, Naveed Sheikh, Dawood Khan. (2021). Topological Structure of Fuzzy PU-new Ideal in PU-algebra. International Journal of Systems Science and Applied Mathematics, 6(4), 125-130. https://doi.org/10.11648/j.ijssam.20210604.13
ACS Style
Muhammad Shafiq; Naveed Sheikh; Dawood Khan. Topological Structure of Fuzzy PU-new Ideal in PU-algebra. Int. J. Syst. Sci. Appl. Math. 2021, 6(4), 125-130. doi: 10.11648/j.ijssam.20210604.13
AMA Style
Muhammad Shafiq, Naveed Sheikh, Dawood Khan. Topological Structure of Fuzzy PU-new Ideal in PU-algebra. Int J Syst Sci Appl Math. 2021;6(4):125-130. doi: 10.11648/j.ijssam.20210604.13
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Download@article{10.11648/j.ijssam.20210604.13,
author = {Muhammad Shafiq and Naveed Sheikh and Dawood Khan},
title = {Topological Structure of Fuzzy PU-new Ideal in PU-algebra},
journal = {International Journal of Systems Science and Applied Mathematics},
volume = {6},
number = {4},
pages = {125-130},
doi = {10.11648/j.ijssam.20210604.13},
url = {https://doi.org/10.11648/j.ijssam.20210604.13},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.ijssam.20210604.13},
abstract = {In this manuscript, we consider the fuzzification of the notion PU-new ideal of PU-algebra and define the fuzzy topological terms such that fuzzy topology, τ-open fuzzy set, fuzzy neighborhood, fuzzy interior, sequence of fuzzy sets, fuzzy neighborhood system, fuzzy continuity of a function with respect to PU-new ideal of PU-algebra. We explore the new theorems and related properties of above mention notions with respect to PU-new ideal on PU-algebras. Such that for (Ⱬ, τ) to be a TSFP on Ⱬ and the set Ḟ is a fuzzy in Ⱬ and NḞ be a fuzzy neighborhood system of Ḟ then the finite intersection of elements of ‘NḞ’ is also an element of ‘NḞ’ also any fuzzy set of Ⱬ which contains an element of “NḞ” is also an element of “NḞ”. Furthermore we prove the conditions with respect to fuzzy neighborhood, convergence of a sequence of fuzzy sets, fuzzy interior set of a fuzzy set under which a fuzzy set Ḟ is τ-open. We show that how the function Ψ from (Ⱬ1,τ) to (Ⱬ2,ω) is fuzzy continuous. We prove that if Ψ is a fuzzy continuous function then for every fuzzy set Ḟ in Ⱬ1, inverse of each neighborhood of Ψ(Ḟ) is a neighborhood of a fuzzy set Ḟ.},
year = {2021}
}
TY - JOUR T1 - Topological Structure of Fuzzy PU-new Ideal in PU-algebra AU - Muhammad Shafiq AU - Naveed Sheikh AU - Dawood Khan Y1 - 2021/12/31 PY - 2021 N1 - https://doi.org/10.11648/j.ijssam.20210604.13 DO - 10.11648/j.ijssam.20210604.13 T2 - International Journal of Systems Science and Applied Mathematics JF - International Journal of Systems Science and Applied Mathematics JO - International Journal of Systems Science and Applied Mathematics SP - 125 EP - 130 PB - Science Publishing Group SN - 2575-5803 UR - https://doi.org/10.11648/j.ijssam.20210604.13 AB - In this manuscript, we consider the fuzzification of the notion PU-new ideal of PU-algebra and define the fuzzy topological terms such that fuzzy topology, τ-open fuzzy set, fuzzy neighborhood, fuzzy interior, sequence of fuzzy sets, fuzzy neighborhood system, fuzzy continuity of a function with respect to PU-new ideal of PU-algebra. We explore the new theorems and related properties of above mention notions with respect to PU-new ideal on PU-algebras. Such that for (Ⱬ, τ) to be a TSFP on Ⱬ and the set Ḟ is a fuzzy in Ⱬ and NḞ be a fuzzy neighborhood system of Ḟ then the finite intersection of elements of ‘NḞ’ is also an element of ‘NḞ’ also any fuzzy set of Ⱬ which contains an element of “NḞ” is also an element of “NḞ”. Furthermore we prove the conditions with respect to fuzzy neighborhood, convergence of a sequence of fuzzy sets, fuzzy interior set of a fuzzy set under which a fuzzy set Ḟ is τ-open. We show that how the function Ψ from (Ⱬ1,τ) to (Ⱬ2,ω) is fuzzy continuous. We prove that if Ψ is a fuzzy continuous function then for every fuzzy set Ḟ in Ⱬ1, inverse of each neighborhood of Ψ(Ḟ) is a neighborhood of a fuzzy set Ḟ. VL - 6 IS - 4 ER -
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