Q-Vague Groups and Vague Normal Sub Groups With Respect to (T, S) Norms

A.Solairaju; R. Nagarajan; P. Muruganantham

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Reseach Article

Q-Vague Groups and Vague Normal Sub Groups With Respect to (T, S) Norms

by A.Solairaju, R. Nagarajan, P. Muruganantham

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 15 - Number 7

Year of Publication: 2011

Authors: A.Solairaju, R. Nagarajan, P. Muruganantham

10.5120/1960-2622

A.Solairaju, R. Nagarajan, P. Muruganantham . Q-Vague Groups and Vague Normal Sub Groups With Respect to (T, S) Norms. International Journal of Computer Applications. 15, 7 ( February 2011), 23-27. DOI=10.5120/1960-2622

@article{ 10.5120/1960-2622,

author = { A.Solairaju, R. Nagarajan, P. Muruganantham },

title = { Q-Vague Groups and Vague Normal Sub Groups With Respect to (T, S) Norms },

journal = { International Journal of Computer Applications },

issue_date = { February 2011 },

volume = { 15 },

number = { 7 },

month = { February },

year = { 2011 },

issn = { 0975-8887 },

pages = { 23-27 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume15/number7/1960-2622/ },

doi = { 10.5120/1960-2622 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T20:03:32.054691+05:30

%A A.Solairaju

%A R. Nagarajan

%A P. Muruganantham

%T Q-Vague Groups and Vague Normal Sub Groups With Respect to (T, S) Norms

%J International Journal of Computer Applications

%@ 0975-8887

%V 15

%N 7

%P 23-27

%D 2011

%I Foundation of Computer Science (FCS), NY, USA

Abstract

In this Paper, Q-Vague sets and Q-Vague normal subgroups are studied. The study of Vague groups initiated by Ranjit Biswas [2006] is continued and Q-Vague homologous groups characterized as normal groups which admit a particular type of Q-Vague groups with respect to (mini, max) norms.

References

Demirci. M, Vague groups, Jou-Math Anal. Application. 230 (1999), 142 – 156.
Gau. W.L and Buechrer, D.J, Vague Sets, IEEE Transactions on systems, Man and Cybernetics Vol. 23, (1993), 610 – 614.
Hakiimuddin Khan, M. Ahamed and Ranjit Biswas, On Vague groups, Int. Journal of Computational Cognition, Vol.5, No.1 (2007).
N.P. Mukherjee, Fuzzy normal subgroups and Fuzzycosets, Information sciences, 34, 225 – 239, (1984).
N. Ramakrishna, “Vague normal groups”, International Journal of Computational Cognition, Vol.6, No.2, (2008) 10 – 13.
Ranjit Biswas, Vague groups, Int. Journal of Computational Cognition Vol.4, No.2 (2006).
Rosenfeld. A, Fuzzy groups, Jou. Maths. Anal. Application (35) (1971) 512- 517.
A. Solairaju and R. Nagarajan, A New Structure and Construction of Q-fuzzy groups, Advances in Fuzzy Mathematics, 4(2009), 1, 23-29.
Yunjie Zhang, Some Properies of Fuzzy subgroups, Fuzzy sets and Systems,119 (2001),427– 438.
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Index Terms

Computer Science

Information Sciences

Keywords

Q-Vague set Q-Vague group Q-Vague-cut group Q-Vague normal group Q-Vague centralizer Homologous group