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International Journal of Neutrosophic Science
Volume 19 , Issue 4, PP: 08-28 , 2022 | Cite this article as | XML | Html |PDF

Title

Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators

  M. Palanikumar 1 * ,   Said Broumi 2

1  Department of Mathematics, Saveetha School of Engineering, Saveetha University, Saveetha Institute of Medical and Technical Sciences, Chennai-602105, India
    (palanimaths86@gmail.com)

2  Laboratory of Information Processing, Faculty of Science Ben MSik, University of Hassan II, Casablanca, Morocco;Regional Center for the Professions of Education and Training (C.R.M.E.F), Casablanca-Settat, Morocco
    (broumisaid78@gmail.com)


Doi   :   https://doi.org/10.54216/IJNS.190401

Received: April 28, 2022 Accepted: November 15, 2022

Abstract :

Square root Diophantine neutrosophic interval-valued set (SRDioNIVS) approaches to multiple attribute decisionmaking

(MADM) problems. The square root neutrosophic sets, interval-valued Diophantine neutrosophic sets

are both extensions of square root Diophantine neutrosophic sets. In this section, we discuss aggregating operations

and how those interprtautions have evolved over time. The paper is focused on a novel idea known

as square root neutrosophic interval-valued weighted averaging (SRDioNIVWA), square root neutrosophic

interval-valued weighted geometric (SRDioNIVWG), generalized square root neutrosophic interval-valued

weighted averaging (GSRDioNIVWA), and generalized square root neutrosophic interval-valued weighted geometric

(GSRDioNIVWG). We also begin an algorithm using these operators. The use of the euclidean and

hamming distances is described, and examples from real-world problems are inserted. As a result, the defined

models are more accurate and closely tied to Ξ. In order to show the reliability and usefulness of the models

under examination, we also compare a few of the proposed and current models. The study’s results are also

fascinating and intriguing.

Keywords :

SRDioNIVWA; SRDioNIVWG; GSRDioNIVWA; GSRDioNIVWG

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Cite this Article as :
Style #
MLA M. Palanikumar, Said Broumi. "Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators." International Journal of Neutrosophic Science, Vol. 19, No. 4, 2022 ,PP. 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)
APA M. Palanikumar, Said Broumi. (2022). Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators. Journal of International Journal of Neutrosophic Science, 19 ( 4 ), 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)
Chicago M. Palanikumar, Said Broumi. "Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators." Journal of International Journal of Neutrosophic Science, 19 no. 4 (2022): 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)
Harvard M. Palanikumar, Said Broumi. (2022). Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators. Journal of International Journal of Neutrosophic Science, 19 ( 4 ), 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)
Vancouver M. Palanikumar, Said Broumi. Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators. Journal of International Journal of Neutrosophic Science, (2022); 19 ( 4 ): 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)
IEEE M. Palanikumar, Said Broumi, Multiple attribute decision making for square root diophantine neutrosophic interval-valued sets and their aggregated operators, Journal of International Journal of Neutrosophic Science, Vol. 19 , No. 4 , (2022) : 08-28 (Doi   :  https://doi.org/10.54216/IJNS.190401)