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Structured Dynamics in the Algorithmic Agent. [PDF]
Entropy (Basel)Ruffini G, Castaldo F, Vohryzek J.
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Colombeau products of distributions. [PDF]
Springerplus, 2016 Miteva M +2 more
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Poisson traces, D-modules, and symplectic resolutions. [PDF]
Lett Math Phys, 2018 Etingof P, Schedler T.
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The Port-Hamiltonian Structure of Continuum Mechanics. [PDF]
J Nonlinear SciRashad R, Stramigioli S.
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COHOMOLOGY AND DEFORMATIONS OF GENERALIZED REYNOLDS OPERATORS ON LEIBNIZ ALGEBRAS
Rocky Mountain Journal of MathematicsIn this paper, we introduce generalized Reynolds operators on Leibniz algebras as a generalization of twisted Poisson structures. We define the cohomology of a generalized Reynolds operator K as the Loday-Pirashvili cohomology of a certain Leibniz ...
Shuangjian Guo, Apurba Das
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Mathematical Notes
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
A. Dzhumadil’daev
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
A. Dzhumadil’daev
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On some “minimal” Leibniz algebras
Journal of Algebra and Its Applications, 2017The aim of this paper is to describe some “minimal” Leibniz algebras, that are the Leibniz algebras whose proper subalgebras are Lie algebras, and the Leibniz algebras whose proper subalgebras are abelian.
Chupordia, V. A. +2 more
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1998
This work is devoted to study of comparatively new algebraic object - Leibniz algebras, introduced by Loday [1], as a “non commutative” analogue of Lie algebras.
Sh. A. Ayupov, B. A. Omirov
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This work is devoted to study of comparatively new algebraic object - Leibniz algebras, introduced by Loday [1], as a “non commutative” analogue of Lie algebras.
Sh. A. Ayupov, B. A. Omirov
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Mathematical Notes, 2021
For a class of algebras \(\mathcal{A}\), denote by \(\mathcal{A}_1\) the class of algebras in which every singly generated algebra belongs to the class \(\mathcal{A}\). We similarly define \(\mathcal{A}_2\) as the class of algebras in which every two-generated algebra belongs to the class \(\mathcal{A}\).
Ismailov, N. A., Dzhumadil'daev, A. S.
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For a class of algebras \(\mathcal{A}\), denote by \(\mathcal{A}_1\) the class of algebras in which every singly generated algebra belongs to the class \(\mathcal{A}\). We similarly define \(\mathcal{A}_2\) as the class of algebras in which every two-generated algebra belongs to the class \(\mathcal{A}\).
Ismailov, N. A., Dzhumadil'daev, A. S.
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On the cohomology of solvable Leibniz algebras
Indagationes mathematicae, 2023This paper is a sequel to our article [Feldvoss-Wagemann], where we mainly considered semi-simple Leibniz algebras. It turns out that the analogue of the Hochschild-Serre spectral sequence for Leibniz cohomology cannot be applied to many ideals, and ...
Jörg Feldvoss, F. Wagemann
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