Abstract
Intuitionistic fuzzy sets and soft sets are two different soft computing models for representing vagueness and uncertainty. We apply these soft computing models in combination to study vagueness and uncertainty in K-algebras. We first introduce the notion of \({(\in, \in\vee q)}\)-intuitionistic fuzzy K-algebras and discuss some of their properties. Then we introduce intuitionistic fuzzy soft K-algebras and investigate some of their properties. Finally, we introduce \({(\in, \in \vee q)}\)-intuitionistic fuzzy soft K-algebras and present some of their related properties.
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References
Abdullah S., Davvaz B., Aslam M.: (α, β)-intuitionistic fuzzy ideals of hemirings. Comput. Math. Appl. 62(8), 3077–3090 (2011)
Akram M., Davvaz B.: Generalized fuzzy ideals of K-algebras. J. Multivalued Soft Comput. 19, 475–491 (2012)
Akram M.: Bifuzzy ideals of K-algebras. WSEAS Trans. Math. 7(5), 313–322 (2008)
Akram M., Al-Shehrie N.O., Alghamdi R.S.: Fuzzy soft K-algebras. Utilitas Mathematica 90, 307–325 (2013)
Ali M.I., Feng F., Liu X.Y., Min W.K., Shabir M.: On some new operations in soft set theory. Comput. Math. Appl. 57, 1547–1553 (2009)
Atanassov, K.T.: Intuitionistic fuzzy sets. VII ITKR’s Session, Sofia, June 1983, Deposed in Central Sci-Techn. Library of Bulg. Acad. of Sci., 1697/84 (in Bulgarian)
Bhakat S.K., Das P.: \({(\in, \in \vee q)}\)-fuzzy subgroup. Fuzzy Sets Syst. 80, 359–368 (1996)
Coker D., Demirci M.: On intuitionistic fuzzy points. Notes IFS 1(2), 79–84 (1995)
Dar K.H., Akram M.: On a K-algebra built on a group. Southeast Asian Bull. Math. 29(1), 41–49 (2005)
Dar K.H., Akram M.: On K-homomorphisms of K-algebras. Int. Math. Forum 46, 2283–2293 (2007)
Feng F., Li C.X., Davvaz B., Irfan Ali M.: Soft sets combined with fuzzy sets and rough sets: a tentative approach. Soft Comput. 14, 899–911 (2010)
Feng F., Jun Y.B., Liu X.Y., Li L.F.: An adjustable approach to fuzzy soft set based decision making. J. Comput. Appl. Math. 234, 10–20 (2010)
Feng F., Liu X.Y., Leoreanu-Fotea V., Jun Y.B.: Soft sets and soft rough sets. Inf. Sci. 181, 1125–1137 (2011)
Maji P.K., Biswas R., Roy R.: Soft set theory. Comput. Math. Appl. 45, 555–562 (2003)
Maji P.K., Biswas R., Roy A.R.: Intuitionistic fuzzy soft sets. J. Fuzzy Math. 9(3), 677–692 (2001)
Molodtsov D.: Soft set theory first results. Comput. Math. Appl. 37, 19–31 (1999)
Pu P.M., Liu Y.M.: Fuzzy topology, I. Neighborhood structure of a fuzzy point and Moore-Smith convergence. J. Math. Anal. Appl. 76(2), 571–599 (1980)
Yang C.-F.: Fuzzy soft semigroups and fuzzy soft ideals. Comput. Math. Appl. 61, 255–561 (2011)
Zadeh L.A.: Fuzzy sets. Inf. Control 8, 338–353 (1965)
Zhou J., Li Y., Yin Y.: Intuitionistic fuzzy soft semigroups. Mathematica Aeterna 1, 173–183 (2011)
Yin, Y., Zhan, J.: The characterizations of hemirings in terms of fuzzy soft h-ideals. Neural Comput. Appl. doi:10.1007/s00521-011-0591-9
Zhan J., Jun Y.B.: Soft BL-algebras based on fuzzy sets. Comput. Math. Appl. 59, 2037–2046 (2010)
Dudek W.A.: . Sci. Bull. Series A Appl. Math. Phys. Politeh. Univ. Bucharest 74, 41–56 (2012)
Yin Y.Q., Jun Y.B., Zhan J.M.: Vague soft hemirings. Comput. Math. Appl. 62, 199–213 (2011)
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Akram, M., Davvaz, B. & Feng, F. Intuitionistic Fuzzy Soft K-Algebras. Math.Comput.Sci. 7, 353–365 (2013). https://doi.org/10.1007/s11786-013-0158-5
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DOI: https://doi.org/10.1007/s11786-013-0158-5
Keywords
- K-algebras
- \({(\in, \in \vee q)}\)-intuitionistic fuzzy K-algebra
- Intuitionistic fuzzy K-subalgebras
- \({(\in, \in \vee q)}\)-intuitionistic fuzzy soft K-algebra