On the Fuzzy N-n-Quasi-Normal Operators
DOI:
https://doi.org/10.29304/jqcsm.2025.17.32408Keywords:
quasi-normal operator, fuzzy self adjoint operatorAbstract
In this work, we introduce generalizations of fuzzy -quasinormal operators defined on fuzzy Hilbert spaces over fuzzy vector spaces. We study several fundamental properties of these operators and explore specific operations associated with them
Downloads
References
Zadeh L 1965 Fuzzy sets, Inf. Control 8 338-353.
Biswas R. 1991 Fuzzy inner product spaces and fuzzy norm functions, Information Sciences 53 185-190.
Kohail J K and Kumar R 1993 On fuzzy inner product spaces and fuzzy co- inner product spaces, fuzzy sets and system Bull. Calcutta Math. Soc. 53 227-232.
Kohail J K and Kumar R 1995 Linear mappings, fuzzy linear spaces, fuzzy inner product spaces and fuzzy co-inner product spaces, Bull. Calcutta Math. Soc. 87 237-246.
Goudarizi M and Vaezpour S. M. 2009 On the definition of fuzzy Hilbert spaces and its applications J. Nonlinear Sci. Appl. 2 (1) 46-59.
Raedharamani A, Brinedha A and Maheswari S 2018 Fuzzy normal operator in fuzzy Hilbert space and its properties IOSR Journal of Engineering 8(7) 01-05.
Al-Saphory R, Khalid Z and EL Jai A 2020 Regional boundary gradient closed loop control system and Γ^* AGFO-observer Journal of Physics: Conference Series 1664 012061.
Al-Saphory R, Al-Shaya A and Rekkab S 2020 Regional boundary asymptotic gradient reduced order observer Journal of Physics: Conference Series 1664 012101.
Feilbin C 1992 Finite dimensional fuzzy normed linear space Fuzzy Sets and Systems 48 239-248.
Al-Saphory, R.. (2022). New study of fuzzy ((μ-n))^*-quasinormal operators. Journal of Physics Conference Series. 2022. 1-7.
Downloads
Published
How to Cite
Issue
Section
License
Copyright (c) 2025 Ahmed Talib Kareem
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
