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Fractal charge distribution on closed surfaces generated by finite element triangles. [PDF]
Sci RepChen H, Da B, Ding ZJ.
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Soliton dynamics and stability in resonant nonlinear Schrödinger systems with cubic quintic effects via enhanced modified extended tanh function method. [PDF]
Sci RepTarek A, Ahmed HM, Badra N, Samir I.
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The continuous net benefit: assessing the clinical utility of prediction models when informing a continuum of decisions. [PDF]
Diagn Progn ResBenitez-Aurioles J +5 more
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On Lie Derivations, Generalized Lie Derivations and Lie Centralizers of Octonion Algebras
Ars Combinatoria, 2023Let L be a unital ring with characteristic different from 2 and O ( L ) be an algebra of Octonion over L . In the present article, our attempt is to present the characterization as well as the matrix representation of some variants of derivations on O ( L ) .
Minahal Arshad, M. Mobeen Munir
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LIE -HIGHER DERIVATIONS AND LIE -HIGHER DERIVABLE MAPPINGS
Bulletin of the Australian Mathematical Society, 2017Let ${\mathcal{A}}$ be a unital torsion-free algebra over a unital commutative ring ${\mathcal{R}}$. To characterise Lie $n$-higher derivations on ${\mathcal{A}}$, we give an identity which enables us to transfer problems related to Lie $n$-higher derivations into the same problems concerning Lie $n$-derivations.
YANA DING, JIANKUI LI
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Additive Lie ($��$-Lie) Derivations and Generalized Lie ($��$-Lie) Derivations on Prime Algebras
201011 ...
Qi, Xiaofei, Hou, Jinchuan
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Approximate reciprocal Lie $$\star $$-Derivations
Soft Computing, 2021zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kumar, B. V. Senthil +2 more
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2016
Convection is an important transport mechanism in physics. Especially, in fluid dynamics at high Reynolds numbers this term dominates. Modern mimetic discretization methods consider physical variables as differential k-forms and their discrete analogues as k-cochains. Convection, in this parlance, is represented by the Lie derivative, \(\mathcal{L}_{X}\
Marc Gerritsma +2 more
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Convection is an important transport mechanism in physics. Especially, in fluid dynamics at high Reynolds numbers this term dominates. Modern mimetic discretization methods consider physical variables as differential k-forms and their discrete analogues as k-cochains. Convection, in this parlance, is represented by the Lie derivative, \(\mathcal{L}_{X}\
Marc Gerritsma +2 more
openaire +1 more source