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Issue:Arc analysis in the intuitionistic fuzzy graph and its applications

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http://ifigenia.org/wiki/issue:nifs/22/1/53-62
Title of paper: Arc analysis in the intuitionistic fuzzy graph and its applications
Author(s):
V. Nivethana
Department of Mathematics, Sri Venkateswara Institute of Science and Technology, Thiruvallur, India
paarvathis@rediffmail.com
A. Parvathi
Department of Mathematics, Avinashilingam University, Coimbatore, India
aparvathi.s@gmail.com
Published in: "Notes on IFS", Volume 22 (2016) Number 1, pages 53-62
Download:  PDF (348  Kb, File info)
Abstract: In this paper, a two dimensional approach on arcs of an intuitionistic fuzzy graph is made and the arcs are classified into three types: Sturdy arc, Feeble arc and δ* weak arc. A new concept of firm paths and infirm paths has been introduced and their application in a decision making problem has been shown. IF-bridges and IF-cutnodes are defined with a new notion and their properties are analyzed. We present with a necessary condition for an arc to be an IF-bridge.
Keywords: Intuitionistic fuzzy graph, Arcs in intuitionistic fuzzy graph, IF-bridges, IF-cutnodes, Application in decision making.
AMS Classification: 03E72, 05C38.
References:
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  4. Bhutani, K. R., & Rosenfeld, A. (2003) Strong arcs in fuzzy graphs. Information Sciences, 152, 319–322.
  5. Karunambigai, M. G., Parvathi, R. & Buvaneswari, R. (2012) Arcs in intuitionistic fuzzy graphs. Notes on Intuitionistic Fuzzy Sets, 18(4), 48–58.
  6. Mathew, S., & Sunitha, M.S. (2009) Types of arcs in a fuzzy graph. Information Sciences, 179, 1760–1768.
  7. Tom, M., & Sunitha, M. S. (2013) On strongest paths, delta arcs and blocks in fuzzy graphs. World Applied Sciences Journal, 22, 10–17.
  8. Tom, M., Sunitha, M. S., & Mathew, S. (2014) Notes on types of arcs in fuzzy graphs. Journal of Uncertainty in Mathematical Sciences, 2014, Article ID jums-00004, doi:10.5899/2014/jums-00004.
  9. Nivethana, V., & Parvathi, A. (2015) On Complement of Intuitionistic Fuzzy Graphs, International Journal of Computational and Applied Mathematics, 10(1), 17–26.
  10. Parvathi, R., Shannon, A., Chountas, P. & Atanassov, K. (2011) On intuitionistic fuzzy tree-interpretations by index matrices, Notes on Intuitionistic Fuzzy Sets, 17(2), 17–24.
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