• Title/Summary/Keyword: local commutator

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A NOTE ON LOCAL COMMUTATORS IN DIVISION RINGS WITH INVOLUTION

  • Bien, Mai Hoang
    • Bulletin of the Korean Mathematical Society
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    • v.56 no.3
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    • pp.659-666
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    • 2019
  • In this paper, we consider a conjecture of I. N. Herstein for local commutators of symmetric elements and unitary elements of division rings. For example, we show that if D is a finite dimensional division ring with involution ${\star}$ and if $a{\in}D^*=D{\setminus}\{0\}$ such that local commutators $axa^{-1}x^{-1}$ at a are radical over the center F of D for every $x{\in}D^*$ with $x^{\star}=x$, then either $a{\in}F$ or ${\dim}_F\;D=4$.

CHARACTERIZATION OF LIE TYPE DERIVATION ON VON NEUMANN ALGEBRA WITH LOCAL ACTIONS

  • Ashraf, Mohammad;Jabeen, Aisha
    • Bulletin of the Korean Mathematical Society
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    • v.58 no.5
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    • pp.1193-1208
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    • 2021
  • Let 𝓐 be a von Neumann algebra with no central summands of type I1. In this article, we study Lie n-derivation on von Neumann algebra and prove that every additive Lie n-derivation on a von Neumann algebra has standard form at zero product as well as at projection product.

Characterizations of Lie Triple Higher Derivations of Triangular Algebras by Local Actions

  • Ashraf, Mohammad;Akhtar, Mohd Shuaib;Jabeen, Aisha
    • Kyungpook Mathematical Journal
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    • v.60 no.4
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    • pp.683-710
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    • 2020
  • Let ℕ be the set of nonnegative integers and 𝕬 be a 2-torsion free triangular algebra over a commutative ring ℛ. In the present paper, under some lenient assumptions on 𝕬, it is proved that if Δ = {𝛿n}n∈ℕ is a sequence of ℛ-linear mappings 𝛿n : 𝕬 → 𝕬 satisfying ${\delta}_n([[x,\;y],\;z])\;=\;\displaystyle\sum_{i+j+k=n}\;[[{\delta}_i(x),\;{\delta}_j(y)],\;{\delta}_k(z)]$ for all x, y, z ∈ 𝕬 with xy = 0 (resp. xy = p, where p is a nontrivial idempotent of 𝕬), then for each n ∈ ℕ, 𝛿n = dn + 𝜏n; where dn : 𝕬 → 𝕬 is ℛ-linear mapping satisfying $d_n(xy)\;=\;\displaystyle\sum_{i+j=n}\;d_i(x)d_j(y)$ for all x, y ∈ 𝕬, i.e. 𝒟 = {dn}n∈ℕ is a higher derivation on 𝕬 and 𝜏n : 𝕬 → Z(𝕬) (where Z(𝕬) is the center of 𝕬) is an ℛ-linear map vanishing at every second commutator [[x, y], z] with xy = 0 (resp. xy = p).