B.A. Ersoy
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ABSTRACT
In this paper we generalize Malik and Mordeson’s paper (1991). I analysis the Cartesian product of fuzzy subgroups (ideals ) of different groups (different ideals). That is ; if μ and σ are fuzzy subgroups (ideals) of G1 and G2 (R1 and R2 ) respectively then μ x σ is a fuzzy subgroup (ideal) of G1 x G2 ( ). Conversely the opposite direction of the above statements is studied. We generalize above statements for different Groups (Rings).
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How to cite this article
B.A. Ersoy, 2003. A Generalization of Cartesian Product of Fuzzy Subgroups and Ideals. Journal of Applied Sciences, 3: 100-102.
DOI: 10.3923/jas.2003.100.102
URL: https://scialert.net/abstract/?doi=jas.2003.100.102
DOI: 10.3923/jas.2003.100.102
URL: https://scialert.net/abstract/?doi=jas.2003.100.102
REFERENCES
- Makil, D.S. and J.N. Mordeson, 1991. Fuzzy relations on rings and groups. Fuzzy Sets Syst., 43: 117-123.
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