Results 1 to 10 of about 216,282 (303)
Ο-derivations on generalized matrix algebras
Analele Stiintifice ale Universitatii Ovidius Constanta: Seria Matematica, 2020 Let π be a commutative ring with unity, π, π be π-algebras, π¨ be (π, π)-bimodule and π© be (π, π)-bimodule. The π-algebra π’ = π’(π, π¨, π©, π) is a generalized matrix algebra defined by the Morita context (π, π, π¨, π©, ΞΎπ¨π©, Ξ©π©π¨).
Jabeen Aisha +2 more
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Jordan Derivations and Antiderivations of Generalized Matrix Algebras [PDF]
Operators and Matrices, 2012 Let $\mathcal{G}=[A & M N & B]$ be a generalized matrix algebra defined by the Morita context $(A, B,_AM_B,_BN_A, \Phi_{MN}, \Psi_{NM})$. In this article we mainly study the question of whether there exist proper Jordan derivations for the generalized ...
Feng Wei, Leon Van, Wyk, Yanbo Li
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Local Lie derivations of generalized matrix algebras
AIMS Mathematics, 2023 In this paper, we investigate local Lie derivations of a certain class of generalized matrix algebras and show that, under certain conditions, every local Lie derivation of a generalized matrix algebra is a sum of a derivation and a linear central-valued
Dan Liu , Jianhua Zhang, Mingliang Song
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Lie n-centralizers of generalized matrix algebras
AIMS Mathematics, 2023 In this paper, we introduce the notion of Lie $ n $-centralizers. We then give a description of Lie $ n $-centralizers on a generalized matrix algebra and present the necessary and sufficient conditions for a Lie $ n $-centralizer to be proper.
He Yuan , Zhuo Liu
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ON SELBERG-TYPE SQUARE MATRICES INTEGRALS [PDF]
Journal of Algebraic Systems, 2013 In this paper we consider Selberg-type square matrices integrals with focus on Kummer-beta types I & II integrals. For generality of the results for real normed division algebras, the generalized matrix variate Kummer-beta types I & II are defined under ...
Mohammad Arashi
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Generalized Lie n-derivations on generalized matrix algebras
AIMS MathematicsLet $ \mathcal{G} $ be a generalized matrix algebra. We show that under certain conditions, each generalized Lie $ n $-derivation associated with a linear map on $ \mathcal{G} $ is a sum of a generalized derivation and a central map vanishing on all $ (n-
Shan Li , Kaijia Luo, Jiankui Li
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Additivity of nonlinear higher anti-derivable mappings on generalized matrix algebras
Electronic Research Archive, 2023 In this article, we proved that each nonlinear higher anti-derivable mapping on generalized matrix algebras is automatically additive. As for its applications, we find a similar conclusion on triangular algebras, full matrix algebras, unital prime rings ...
Xiuhai Fei, Haifang Zhang
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Generalized Quaternions and Matrix Algebra
Afyon Kocatepe University Journal of Sciences and Engineering, 2023 In this paper, we established the connection between generalized quaternion algebra and real (complex) matrix algebras by using Hamilton operators. We obtained real and complex matrices corresponding to the real and complex basis of the generalized quaternions. Also, we investigated the basis features of real and complex matrices. We get Pauli matrices
Erhan ATA, Γmit Ziya SAVCI
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Generalized Jordan N-Derivations of Unital Algebras with Idempotents
Journal of Mathematics, 2021 Let A be a unital algebra with idempotent e over a 2-torsionfree unital commutative ring β and S:AβΆA be an arbitrary generalized Jordan n-derivation associated with a Jordan n-derivation J.
Xinfeng Liang
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Scattering in Algebraic Approach to Quantum TheoryβAssociative Algebras
Universe, 2022 The definitions of scattering matrix and inclusive scattering matrix in the framework of formulation of quantum field theory in terms of associative algebras with involution are presented. The scattering matrix is expressed in terms of Green functions on
Albert Schwarz
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