Results 91 to 100 of about 1,036 (187)
Bipolar Fuzzy Sheffer Stroke in BCK-Algebras
AxiomsIn this study, we examine bipolar fuzzy SBCK-subalgebras and their corresponding level sets of bipolar fuzzy sets in the setting of Sheffer stroke BCK-algebras.
Tahsin Oner +3 more
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MBJ-neutrosophic ideals of BCK/BCI-algebras
Open Mathematics, 2019 The notion of MBJ-neutrosophic ideal is introduced, and its properties are investigated. Conditions for an MBJ-neutrosophic set to be an MBJ-neutrosophic ideal are provided.
Jun Young Bae, Roh Eun Hwan
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Intuitionistic Falling Shadow Theory with Applications in BCK/BCI-Algebras
Mathematics, 2018 Intuitionistic falling shadow is introduced, and applied to B C K / B C I -algebras. Falling intuitionistic subalgebra and falling intuitionistic ideal of B C K / B C I -algebras are introduced, and related properties are investigated ...
Young Bae Jun +2 more
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On Subalgebras of the Car-Algebra
Journal of Functional Analysis, 1995 Based on a construction of Voiculescu, \textit{B. Blackadar} [J. Oper. Theory 14, 347-350 (1985; Zbl 0598.46037)] has shown that the Cuntz algebra \({\mathcal O}_2\) is a subquotient of the CAR-algebra. Because Choi found a \(C^*\)-algebra monomorphism of the regular \(C^*\)-group algebra of \(\text{PSL}_2(Z)\) into \({\mathcal O}_2\), by a theorem of ...
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Journal of New Theory, 2017 This paper deals the notion of Ω −N -structured subalgebras and Ω−N -structured Filters on CI-algebra.
Prakasam Muralikrishna +1 more
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Известия Иркутского государственного университета: Серия "Математика", 2019 In 1905 I.~Shur pointed out the largest dimension of commutative subgroups in the groups $SL(n,\mathbb{C})$ and proved that for $n>3$ such the subgroups are automorphic to each other.
F.M. Kirillova
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Symmetry, Integrability and Geometry: Methods and Applications, 2008 This paper builds on the previous paper by the author, where a relationship between Zhedanov's algebra AW(3) and the double affine Hecke algebra (DAHA) corresponding to the Askey-Wilson polynomials was established.
Tom H. Koornwinder
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Subalgebras of Group Algebras [PDF]
Proceedings of the American Mathematical Society, 1969 I. Let G be a locally compact group and m its Haar measure. For any m-measurable subset S of G, let L(S) be the subspace of L1(G) consisting of elements f such that fG\S If I dm =0. If S is a subsemigroup then L(S) is a subalgebra of L1(G). Various papers ([4], [5] and [7]) have been devoted to the study of L(S) and to the question of whether there is ...
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Journal of Algebra, 2002 Because of its connections with Lie algebras, algebraic groups and quantum groups, as well as representation theory and group theory, the Schur algebra is an object of much interest; in particular, calculating decomposition multiplicities of modules for this algebra has attracted a lot of interest in recent years.
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Soft ComputingAbstractIn this paper, we introduce the concepts of subalgebras, principal subalgebras and $$d_{L}$$ d L -subalgebras of a principal MS-algebra and describe the lattices of such subalgebras. Also, we describe a subalgebra [S] that generated by a subset S of an
Abd El-Mohsen Badawy +2 more
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