Generalized T-Norms, T-Co-Norms, and Neutrosophic Inner Product Spaces: A Comprehensive Overview | ||||
| SVU−International Journal of Basic Sciences | ||||
| Article 1, Volume 2, Issue 1, June 2025, Page 1-9 PDF (680.75 K) | ||||
| Document Type: Original Article | ||||
| DOI: 10.21608/svuijbs.2024.315222.1000 | ||||
 View on SCiNiTO | ||||
| Authors | ||||
Saleh Omran  ; Amr Elrawy
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| Mathematics Department, Faculty of Science, South Valley University, Qena 83523, Egypt | ||||
| Abstract | ||||
| In this study, we delve into the fundamental concepts of generalized t-norm and t-co-norm, which play a pivotal role in the advanced mathematical framework for handling uncertainties. These definitions are meticulously detailed, serving as the cornerstone for the reconceptualization of fuzzy inner product spaces and intuitionistic fuzzy inner product spaces. By extending these concepts, we pave the way for the introduction of neutrosophic inner product spaces (NIPSs), a novel mathematical structure that accommodates the indeterminate and inconsistent information inherent in real-world problems. The newly defined NIPSs give rise to the exploration and definition of several associated properties, further enriching the theory. Additionally, the formulation and analysis of the parallelogram law within this neutrosophic context is discussed, highlighting its implications and potential applications. This paper aims to contribute to the ongoing research in fuzzy and neutrosophic systems by providing a robust mathematical foundation for future studies and practical implementations. | ||||
| Keywords | ||||
| Neutrosophic sets; neutrosophic normed spaces; neutrosophic inner product; T-Norms; T-Co-Norms | ||||
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