Anti Q-M-Fuzzy Normal Subgroups

S Palaniyandi, R Jahir Hussain

Abstract


Numerous subject fields have made use of the fuzzy idea. Both the M-fuzzy level subsets and the anti Q-M-fuzzy normal subgroups are defined. You will also discover some group Q-M-homomorphism and group anti Q-M-homomorphism results in this study.

Keywords


Q-M-Fuzzy subgroup, Q-M- Fuzzy Normal Subgroups, Anti Q-M- Fuzzy Normal Subgroups, group Q-M-Homomorphism and group anti Q-M-Homomorphism

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References


M. Asaad. Groups and fuzzy subgroups. Fuzzy sets and systems, 39(3):323–328,1991.

R. Biswas. Fuzzy subgroups and anti fuzzy subgroups. Fuzzy sets and Systems,35(1):121–124, 1990.

N. Jacobson. Lectures in abstract algebra. eBook, 1951.

N. Palaniappan and R. Muthuraj. Anti fuzzy group and lower level subgroups.Antartica J.Math, 1(1):71–76, 2004.

A. Rosenfeld. fuzzy groups. J. math. Anal.Appl., 35(3):512–517, 1971.

P. Sithar Selvam, T. Priya, K. Nagalakshmi, and T. Ramachandran. On someproperties of anti-q-fuzzy normal subgroups. Gen. Math. Notes, 22(1):1–10,2014.

A. Solairaju and R. Nagarajan. A new structure and construction of q-fuzzygroups. Advances in Fuzzy Mathematics, 4(1):23–29, 2009.

L. Zadeh. Fuzzy setl. Information and Control, 8(3):338–353, 1965.




DOI: http://dx.doi.org/10.23755/rm.v46i0.1073

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