q-rung square root interval-valued neutrosophic sets with respect to aggregated operators using multiple attribute decision making

International Journal of Neutrosophic Science IJNS 2690-6805 2692-6148 10.54216/IJNS https://www.americaspg.com/journals/show/2484 2020 2020 q-rung square root interval-valued neutrosophic sets with respect to aggregated operators using multiple attribute decision making Department of Mathematics, Thanthai Periyar Government Arts and Science College (affiliated to Bharathidasan University), Tiruchirappalli 624024, Tamilnadu, India C. Sivakumar Department of Mathematics, Jerash University, Jerash 26150, Jordan Mowafaq Omar Al Al-Qadri Department of Mathematics, The Hashemite University, Faculty of Science, Zarqa 13133, PO box 330127, Jordan Abdallah shihadeh Department of computer information systems The university of Jordan-Aqaba Ahmed Atallah Alsaraireh Department of Mathematics, Faculty of Science and Technology, Irbid National University, P.O. Box: 2600 Irbid, Jordan Abdallah Al Al-Husban Department of Mathematics, Thanthai Periyar Government Arts and Science College (affiliated to Bharathidasan University), Tiruchirappalli 624024, Tamilnadu, India P. Maragatha Meenakshi Department of Mathematics, Rajah Serfoji Government College, Thanjavur 613005, Tamilnadu, India N. Rajesh Department of Mathematics Saveetha School of Engineering, Saveetha Institute of Medical and Technical Sciences, Chennai-602105, India M. Palanikumar This paper introduces the concept of multiple attribute decision making (MADM) using q-rung square root interval valued neutrosophic sets (q-rung SRIVNS). The interval valued neutrosophic set (IVNS) and the q-rung square root neutrosophic set (q-rung SRNS) deals with the q-rung SRIVNS. The purpose of this article is to provide an analysis of several aggregating operations. In this article, we discuss a novel idea for the q-rung square root interval valued neutrosophic weighted averaging (q-rung SRIVNWA), q-rung ortho square root interval valued neutrosophic weighted geometric (q-rung SRIVNWG), generalized q-rung SRIVN weighted averaging (q-rung GSRIVNWA) and generalized q-rung SRIVN weighted geometric (q-rung GSRIVNWG). Using Euclidean distances and Hamming distances is illustrated with examples. These sets will be subjected to various algebraic operations in this communication. By doing this, models will be more accurate and will be closed to an integer q. The four most important factors for courier services in India are reliability, turnaround time, payment options, and tracking capabilities. Expert judgments and criteria will determine the most appropriate options. Furthermore, several proposed and current models are compared to demonstrate their reliability and utility. A fascinating and intriguing conclusion can be drawn from the study. 2024 2024 154 174 10.54216/IJNS.230314 https://www.americaspg.com/articleinfo/21/show/2484