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Lie algebras and algebras of associative type are then used to describe the structure of finite-dimensional semisimple modular Lie algebras. It is proved
Lie algebras and algebras of associative type are then used to describe the structure of finite-dimensional semisimple modular Lie algebras. It is proved
Composition structure of alternative and Mal’tcev algebrasComposition structure of alternative and Mal’tcev algebras
Algorithmic reducibilities of algebraic structuresWe describe all possible relations between certain reducibities of algebraic structures which
Foliations associated with the structure of a manifold over a Grassmann algebra of even degree exterior formsIn this paper we consider a category of manifolds over the algebra of even degree exterior forms
Conformal Mappings, Hyperanalyticity and Field DynamicsGeneralization of complex analysis to the case of noncommutative algebras of a quaternion-like type
Subspace Structures in Inner Product Spaces and von Neumann Algebras algebra. The interplay between order properties of the poset of affiliated subspaces and the structure
The Goldie Theorem for H-semiprime algebrasThe main result states that, under certain assumptions about a Hopf algebra H, every H
Minimality of convergence in measure topologies on finite von Neumann algebrasWe prove that the natural embedding of the metric ideal space on a finite von Neumann algebra M
Uniform reducibility of representability problems for algebraic structuresGiven a countable algebraic structure B with no degree we find sufficient conditions
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