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The restricted simple Lie algebras are of classical or Cartan type. [PDF]
Proc Natl Acad Sci U S A, 1984 Block RE, Wilson RL.
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Natural Alternatives to Natural Number: The Case of Ratio. [PDF]
J Numer Cogn, 2018 Matthews PG, Ellis AB.
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Methodological Problems on the Way to Integrative Human Neuroscience. [PDF]
Front Integr Neurosci, 2016 Kotchoubey B +14 more
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A PROPERTY OF SPECIAL JORDAN ALGEBRAS. [PDF]
Proc Natl Acad Sci U S A, 1956 Albert AA.
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JORDAN HOMOMORPHISMS ON ASSOCIATIVE PAIRS
JP Journal of Algebra, Number Theory and Applications, 2017Summary: The aim of this paper consists in proving that any Jordan homomorphism defined from an associative pair \(A=(A^+,A^-)\) onto a prime associative pair \(B=(B^+,B^-)\) is a homomorphism or an antihomomorphism generalizing by the way a brilliant result due to \textit{I. N. Herstein} [Trans. Am. Math. Soc. 81, 331--341 (1956; Zbl 0073.02202)] to a
Zarhouti, Chafika, Marhnine, Hassan
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Characterizations of Jordan derivations and Jordan homomorphisms
Linear and Multilinear Algebra, 2011Let 𝒜 be a unital Banach algebra and ℳ be a unital 𝒜-bimodule. We show that if δ is a linear mapping from 𝒜 into ℳ satisfying δ(ST) = δ(S)T +Sδ(T) for any S, T ∈ 𝒜 with ST = W, where W is a left or right separating point of ℳ, then δ is a Jordan derivation.
Jiankui Li, Jiren Zhou
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On \((n,m)\)-Jordan homomorphisms on algebras
2021Summary: In this paper, we show that every \((n,m)\)-Jordan homomorphism between two commutative algebras is an \((n,m)\)-homomorphism. For the non-commutative case, we prove that every surjective \((2,m)\)-Jordan homomorphism from an algebra \(\mathcal{A}\) to a semiprime commutative algebra \(\mathcal{B}\) is \((2,m)\)-homomorphism.
Bodaghi, Abasalt +2 more
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Asymptotic Behavior of n-Jordan Homomorphisms
Mediterranean Journal of Mathematics, 2020The notion of \(n\)-Jordan homomorphism was introduced by \textit{I. N. Herstein} [Trans. Am. Math. Soc. 81, 331--341 (1956; Zbl 0073.02202)]. The author corrects the statements of the main results given by \textit{Sh. G. Ghaleh} and \textit{Kh. Ghasemi} [Bull. Iran. Math. Soc. 39, No.
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Characterization of additive *-homomorphisms and Jordan *-homomorphisms on operator ideals
Aequationes Mathematicae, 1998zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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