NEAR RINGS IN THE VIEW OF DOUBLE-FRAMED SOFT FUZZY SETS
Year 2019,
Volume: 37 Issue: 1, 175 - 186, 01.03.2019
Mohammed Bilal Khan
Vildan Çetkin
Tahir Mahmood
Naeem Jan
Kifayat Ullah
Halis Aygün
Abstract
In this study, we aim to consider a new kind of a set called by a double framed soft fuzzy set, which is convenient to handle the real world applications and to investigate the near rings in the view of this new set. We define some of the elementary set operations of double framed soft fuzzy sets. We propose the notion of double framed soft fuzzy near rings (ideals) with several properties and characteristics. Further, we illustrate the given notions with some examples.
References
- [1] Phuong, N. H., &Kreinovich, V. (2001). Fuzzy logic and its applications in medicine, International Journal of Medical Informatics, 62(2-3), 165-173.
- [2] Zadeh, L. A. (1996). Fuzzy sets. In Fuzzy Sets, Fuzzy Logic, and Fuzzy Systems: Selected Papers by Lotfi A Zadeh (pp. 394-432).
- [3] Atanassov, K. T. (1999). Intuitionistic fuzzy sets. In Intuitionistic Fuzzy Sets (pp. 1-137). Physica, Heidelberg.
- [4] Pawlak, Z. (1982). Rough sets. International journal of computer & information sciences, 11(5), 341-356.
- [5] Molodtsov, D. (1999). Soft set theory—first results. Computers & Mathematics with Applications, 37(4-5), 19-31.
- [6] Maji, P. K., Biswas, R., & Roy, A. (2001). Fuzzy soft sets. Journal of Fuzzy Mathematics, vol. 9, no. 3, pp. 589–602, 2001.
- [7] Roy, A. R., &Maji, P. K. (2007). A fuzzy soft set theoretic approach to decision making problems. Journal of Computational and Applied Mathematics, 203(2), 412-418.
- [8] Mahmood, T., Ullah, M., Khan, M. B., &Ullah, K. (2017). On Twisted Soft Ideal of Soft Ordered Semigroups. Journal of Information Communication Technologies and Robotics Applications (JICTRA). (Formally known as Journal of Computer Science of NICE). ISSN# 2226-3683, 8, 74-85.
- [9] Khan, A., & Muhammad, N. (2016). On (∈,∈∨q)(∈,∈∨q)-intuitionistic fuzzy ideals of soft semigroups. International Journal of Machine Learning and Cybernetics, 7(4), 553-562.
- [10] A. Aygünoğlu, V. Çetkin, H. Aygün. (2014) An introduction to fuzzy soft topological spaces. Hacettepe Journal of Mathematics and Statistics, 43, 197-208
- [11] V. Çetkin, H. Aygün. (2016) On convergence of soft nets, Journal of Multiple-Valued Logic and Soft Computing, 26(3-5), 175-187.
- [12] V. Çetkin, H. Aygün. (2016) On L-soft Merotopies, Soft Computing, 20(12), 4779-4790
- [13] Jun, Y. B., &Ahn, S. S. (2012). Double-framed soft sets with applications in BCK/BCI-algebras. Journal of Applied Mathematics.
- [14] Cho, Y. U., Lee, K. J., & Jun, Y. B. (2015). A study on double-framed soft near-rings. Applied Mathematical Sciences, 9(18), 867-873.
- [15] Jun, Y. B., Muhiuddin, G., & Al-roqi, A. M. (2013). Ideal theory of BCK/BCI-algebras based on double-framed soft sets. Applied Mathematics & Information Sciences, 7(5), 1879.
- [16] Hadipour, A. R. (2014). Double-framed Soft BF-algebras. Indian Journal of Science and Technology, 7(4), 491-496.
- [17] Hayat, K., Cao, B. Y., Mahmood, T., & Tariq, K. U. H. (2016). Applications of double-framed soft ideals in BE-algebras. New trends in Mathematical Sciences, 4(2), 285-295.
- [18] Khan, A., Izhar, M., &Khalaf, M. M. (2017). Double-framed soft LA-semigroups. Journal of Intelligent & Fuzzy Systems, 33(6), 3339-3353. [19] Khan, M. B., & Mahmood, T. (2018). Applications of Double Framed T-Soft Fuzzy Sets in BCK/BCI-Algebras, submitted.