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Comments on “Fuzzy inner product spaces”
Fuzzy Sets and Systems, 2019zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Jian-Zhong Xiao
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Fuzzy Sets and Systems, 1991
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
El-Abyad, Abdelwahab M. +1 more
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
El-Abyad, Abdelwahab M. +1 more
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On fuzzy inner product spaces and fuzzy co-inner product spaces
Fuzzy Sets and Systems, 1993zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kohli, J. K., Kumar, Rajesh
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Fuzzy inner product spaces and fuzzy norm functions
Information Sciences, 1991zbMATH Open Web Interface contents unavailable due to conflicting licenses.
R. Biswas
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FUZZY WEAK $n$-INNER PRODUCT SPACE
South East Asian Journal of Mathematics and Mathematical SciencesThe paper is concerned with fuzzy real numbers and Felbin-type fuzzy inner product spaces. At first, we study fuzzy 2-inner product and discuss a few basic results of fuzzy inner product and fuzzy $2$-inner product. The existence of fuzzy $2$-inner product is proved with the help of an example.
Bimalendu Kalita +1 more
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Examples, properties and applications of fuzzy inner product spaces
Soft Computing, 2022Jian-Zhong Xiao
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Some Aspects of Intuitionistic Fuzzy 2-Inner Product Space
Asian Journal of Research in Social Sciences and Humanities, 2016In this paper, the concept of Intuitionistic fuzzy 2- inner product space is introduced. By virtue of this definition, parallelogram law and Polarization Identity are proved.
N. Saivaraju, V. Tamilselvan
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A comparative study of fuzzy inner product spaces
2015Summary: In the present paper, we investigate a connection between two fuzzy inner product one of which arises from Felbin's fuzzy norm [\textit{C. Felbin}, Fuzzy Sets Syst. 48, No.~2, 239--248 (1992; Zbl 0770.46038)] and the other is based on Bag and Samanta's fuzzy norm [\textit{T. Bag} and \textit{S. K. Samanta}, J. Fuzzy Math.
M. Saheli
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Some properties of 2-fuzzy soft binormal operator in 2-fuzzy soft 2-inner product space
International Journal of Mathematics and Computer ScienceThis work presents a study of operators in the 2-fuzzy soft 2-inner product space. This article discusses the 2-fuzzy soft self-adjoint and 2-fuzzy soft binormal operators, as well as their characteristics.
H. Mousa
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Fuzzy real weak inner product: a new approach to fuzzy inner products
Soft Computing, 2023Taechang Byun, Ji Eun Lee, Jin Hee Yoon
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