Affiliation:
1. Department of Mathematics, Amasya University, Amasya 05100, Turkey
Abstract
Octahedron sets, which extend beyond the previously defined fuzzy set and soft set concepts to address uncertainty, represent a hybrid set theory that incorporates three distinct systems: interval-valued fuzzy sets, intuitionistic fuzzy sets, and traditional fuzzy set components. This comprehensive set theory is designed to express all information provided by decision makers as interval-valued intuitionistic fuzzy decision matrices, addressing a broader range of demands than conventional fuzzy decision-making methods. Multi-criteria decision-making (MCDM) methods are essential tools for analyzing and evaluating alternatives across multiple dimensions, enabling informed decision making aligned with strategic objectives. In this study, we applied MCDM methods to octahedron sets for the first time, optimizing decision results by considering various constraints and preferences. By employing an MCDM algorithm, this study demonstrated how the integration of MCDM into octahedron sets can significantly enhance decision-making processes. The algorithm allowed for the systematic evaluation of alternatives, showcasing the practical utility and effectiveness of octahedron sets in real-world scenarios. This approach was validated through influential examples, underscoring the value of algorithms in leveraging the full potential of octahedron sets. Furthermore, the application of MCDM to octahedron sets revealed that this hybrid structure could handle a wider range of decision-making problems more effectively than traditional fuzzy set approaches. This study not only highlights the theoretical advancements brought by octahedron sets but also provides practical evidence of their application, proving their importance and usefulness in complex decision-making environments. Overall, the integration of octahedron sets and MCDM methods marks a significant step forward in decision science, offering a robust framework for addressing uncertainty and optimizing decision outcomes. This research paves the way for future studies to explore the full capabilities of octahedron sets, potentially transforming decision-making practices across various fields.
Reference27 articles.
1. Şenel, G., Lee, J.-G., and Hur, K. (2020). Distance and similarity measures for octahedron sets and their application to MCGDM problems. Mathematics, 8.
2. Lee, J.G., Jun, Y.B., and Hur, K. (2020). Octahedron subgroups and subrings. Mathematics, 8.
3. Octahedron topological spaces;Lee;Ann. Fuzzy Math. Inform.,2021
4. Octahedron topological groups;Han;Ann. Fuzzy Math. Inform.,2021
5. Multi-attribute decision-making based on soft set theory: A systematic review;Khameneh;Soft Comput.,2019