International Journal of Neutrosophic Science

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https://doi.org/10.54216/IJNS

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Volume 24 , Issue 1 , PP: 281-295, 2024 | Cite this article as | XML | Html | PDF | Full Length Article

Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators

Murugan Palanikumar 1 , Lejo J. Manavalan 2 , T. T. Raman 3 , Aiyared Iampan 4 *

  • 1 Saveetha School of Engineering, Saveetha Institute of Medical and Technical Sciences, Chennai-602105, India - (palanimaths86@gmail.com)
  • 2 Department of Mathematics, Little Flower College-680103, Guruvayoor, India - (lejo@littleflowercollege.edu.in)
  • 3 Department of Mathematics, St. Joseph’s Institute of Technology, OMR, Chennai-600119, India - (ramanstat@gmail.com)
  • 4 Department of Mathematics, School of Science, University of Phayao, Mae Ka, Mueang, Phayao 56000, Thailand - (aiyared.ia@up.ac.th)
  • Doi: https://doi.org/10.54216/IJNS.240125

    Received: October 08, 2023 Revised: February 13, 2024 Accepted: March 08, 2024
    Abstract

    This article discusses a new approach to multiple attribute decision-making (MADM) based on sine trigonometric (ST) (l1, l2, l3) neutrosophic  sets (NS). We discuss the concept of ST (l1, l2, l3) neutrosophic weighted averaging (NWA), ST (l1, l2, l3) neutrosophic weighted geometric (NWG), ST (l1, l2, l3) generalized neutrosophic weighted averaging (GNWA) and ST (l1, l2, l3) generalized neutrosophic weighted geometric (GNWG). We presented during our discussion showed an algorithm that used these operators. Extensive Hamming distances are illustrated numerically. Also included in this communication are discussions of idempotency, boundness, commutativity, and monotonicity for ST (l1, l2, l3) neutrosophic sets. By using them, you can find the best option faster, easier, and more conveniently. As a result, ST (l1, l2, l3) and more precise conclusions are more closely related. A comparison is made between some current models and those proposed to demonstrate the dependability and utility of the current models. Furthermore, fascinating findings were revealed in the study.

    Keywords :

    Aggregating operator , decision making , STNWA , STNWG , STGNWA and STGNWG.

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    Cite This Article As :
    Palanikumar, Murugan. , J., Lejo. , T., T.. , Iampan, Aiyared. Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators. International Journal of Neutrosophic Science, vol. , no. , 2024, pp. 281-295. DOI: https://doi.org/10.54216/IJNS.240125
    Palanikumar, M. J., L. T., T. Iampan, A. (2024). Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators. International Journal of Neutrosophic Science, (), 281-295. DOI: https://doi.org/10.54216/IJNS.240125
    Palanikumar, Murugan. J., Lejo. T., T.. Iampan, Aiyared. Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators. International Journal of Neutrosophic Science , no. (2024): 281-295. DOI: https://doi.org/10.54216/IJNS.240125
    Palanikumar, M. , J., L. , T., T. , Iampan, A. (2024) . Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators. International Journal of Neutrosophic Science , () , 281-295 . DOI: https://doi.org/10.54216/IJNS.240125
    Palanikumar M. , J. L. , T. T. , Iampan A. [2024]. Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators. International Journal of Neutrosophic Science. (): 281-295. DOI: https://doi.org/10.54216/IJNS.240125
    Palanikumar, M. J., L. T., T. Iampan, A. "Robots selection for sine trigonometric (l1, l2, l3) neutrosophic sets using different aggregation operators," International Journal of Neutrosophic Science, vol. , no. , pp. 281-295, 2024. DOI: https://doi.org/10.54216/IJNS.240125