Connectedness in Fuzzy bitopological Spaces

M.K. Gupta r_p_rp@rediffmail.com
Rupen Pratap Singh r_p_rp@dediffmail.com

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Abstract

In this paper, we extend the four notions of connectedness introduced by Ajmal and Kohli [1] to pairwise connectedness for an arbitrary fuzzy set in fuzzy bitopological spaces (X, Ï„₁, Ï„₂) and discuss the implications that exist between them. These conditions are called Ñ_k- pairwise connectedness (k = 1, 2, 3, 4). We establish that the union of an arbitrary family of Ñ_k- pairwise connected (k = 1, 2) fuzzy set which are pairwise intersecting is Ñ_k- pairwise connected (k = 1, 2). Also the union of arbitrary family of Ñ_k- pairwise connected (k = 3, 4) fuzzy set which are overlapping is Ñ_k- pairwise connected (k = 3, 4). It is also shown that (Ï„_i, Ï„_j)- closure of a Ñ₁- pairwise connected fuzzy set. We also discuss the preservation of Ñ_k- pairwise connectedness (k = 1, 2, 3, 4) under fuzzy pairwise continuous mapping and fuzzy pairwise open mapping.

Keywords

Fuzzy bitopological spaces , Fuzzy pairwise connectedness , fuzzy pairwise continuity , overlapping

M.K. Gupta Department of Mathematics. Ch. Charan Singh University Meerut-250005, India.
Rupen Pratap Singh Department of Mathematics. Ch. Charan Singh University Meerut-250005, India.

Pages: 1–11
Date Published: 2007-04-01
Vol. 9 No. 1 (2007): CUBO, A Mathematical Journal

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Published

2007-04-01

How to Cite

[1]

M. Gupta and R. Pratap Singh, “Connectedness in Fuzzy bitopological Spaces”, CUBO, vol. 9, no. 1, pp. 1–11, Apr. 2007.

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Vol. 9 No. 1 (2007): CUBO, A Mathematical Journal

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