Volume 24 • Issue 4 • PP: 411-419 • 2024
Secondary Partial Ordering of Neutrosophic Fuzzy Matrices
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In this article, we define secondary generalized inverse of a neutrosophic fuzzy matrices whenever exists. . Also, the S-ordering for the set of neutrosophic fuzzy matrices are defined and characterized. A necessary and sufficient condition for the existence of secondary generalized inverse of neutrosophic fuzzy matrices with the help of S-ordering is obtained.
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References
[1] M. Anandhkumar, B. Kanimozhi, S. M. Chithra, V. Kamalakannan, S. Broumi, On various Inverse of Neutrosophic Fuzzy Matrices, International Journal of Neutrosophic Science, Volume 21, Issue 2, Pages 20 - 31,2023.
[2] K. T. Atanassov, Intuitionistic fuzzy sets. Fuzzy Sets and Systems, 20(1), 87-96, (1996).
[3] J. Cen, Fuzzy matrix partial orderings and generalized inverses, Fuzzy Sets and Systems, Volume 105, Issue 3, 1 pp. 453-458 (1999)
[4] S. Das, B. K. Roy, M. B. Kar, Neutrosophic fuzzy set and its application in decision making. J Ambient Intell Human Comput 11, 5017–5029 (2020). https://doi.org/10.1007/s12652-020-01808-3
[5] I. Deli, S. Broumi, Neutrosophic soft matrices and NSM-decision making, Journal of Intelligent and Fuzzy Systems, 28 (5), pp. 2233-2241, (2015) https://www.iospress.nl/journal/journal-of-intelligentfuzzy-systems/ doi: 10.3233/IFS-141505
[6] M. Dhar, S. Broumi, F. Smarandache, A Note on Square Neutrosophic Fuzzy Matrices, Neutrosophic Sets and Systems, Vol. 3, 2014
[7] M. Dijana, P. S. Stanimirovic, I. I. Kyrchei. Index-MP and MP-index matrices[J]. Journal of Mathemat- ´ ical Analysis and Applications, 2023(0022247X): 128004.
[8] D. Shenoy Secondary range symmetric matrices, [version 1; peer review: 1 approved]. F1000Research 2024, 13:112 (https://doi.org/10.12688/f1000research.144171.1)
[9] W. B. V. Kandasamy and F. Smarandache,” FuzzyRelational Maps and Neutrosophic Relational Maps” , HEXISChurch Rock ,2004, book, 302 pages
[10] M. P. Karantha, Mohana, D.P. Shenoy,Minus partial order on regular matrices, Linear and Multilinear Algebra, 64(5), pp. 929–941 (2016).
[11] Baksalary, J. K., & Trenkler, G. (2010). "Core inverse of matrices: Properties and applications." Linear and Multilinear Algebra, 58(6), 681–697. doi: 10.1080/03081080903287555
[12] M. Priya, L.Sebastian, T. Baiju, Neutrosophic Fuzzy Score Matrices: A Robust Framework for Advancing Medical Diagnostics, International Journal of Neutrosophic ScienceVolume 23, Issue 3, Pages 08 - 17, (2024)
[13] M. Priya, L. Sebasastian, Hausdorff distance of neutrosophic fuzzy sets for medical diagnosis, AIP Conference ProceedingsVolume 2875, Issue 129 June 2023.
[14] V. Savitha, D. P. Shenoy, K. Umashankar and R. B. Bapat, Secondary transpose of a matrix and generalized inverses, Journal of Algebra and its applications, 23(3), Article No. 2450052, 2024.
[15] D. P. Shenoy, Drazin theta and theta Drazin matrices, Numerical Algebra, Control and Optimization, 14(2), pp: 273-283,(2024)doi: 10.3934/naco.2022023
[16] D.P. Shenoy, Outer theta and theta outer inverses, IAENG International Journal of Applied Mathematics, 52(4), 2022, pp. 1020-1024.
[17] D.P. Shenoy, Drazin-Theta inverse for rectangular matrices, IAENG International Journal of Computer Science, 50(4), 2023, pp. 1517-1521
[18] F. Smarandache, ”Neutrosophy. / Neutrosophic Probability, Set, and Logic”, ProQuest Information & Learning, Ann Arbor, Michigan, USA, 105 p., 1998
[19] F. Smarandache, Neutrosophy. Neutrosophic Probability, Set, and Logic. Amer. Res. Press, Rehoboth, USA, 105 p., 2006.
[20] H. Wu, Y. Yuan, L.Wei, L. Pei, On entropy, similarity measure and cross-entropy of single-valued neutrosophic sets and their application in multi-attribute decision making, Soft Computing, 22 (22), pp. 7367-7376(2018).
[21] L.A.Zadeh, Fuzzy Sets, Information and Control, 8, 338-353, (1965).
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