Zur Nilpotenz gewisser assoziativer Ringe
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Publication:775597
DOI10.1007/BF01470877zbMath0106.25402MaRDI QIDQ775597
Publication date: 1963
Published in: Mathematische Annalen (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/161025
Related Items (34)
On Braided Lie Structures of Algebras in the Categories of Weak Hopf Bimodules ⋮ ON THE GENERALIZED H-LIE STRUCTURE OF ASSOCIATIVE ALGEBRAS IN YETTER-DRINFELD CATEGORIES ⋮ Identities of sums of commutative subalgebras ⋮ On rings which are sums of two subrings ⋮ Generalized polynomial identities and rings which are sums of two subrings ⋮ On the representation of fields as finite sums of proper subfields ⋮ On radicals of rings which are sums of two subrings ⋮ Universal sums of abelian subalgebras ⋮ A ring which is a sum of two PI subrings is always a PI ring ⋮ Nil properties for rings which are sums of their additive subgroups ⋮ On rings which are sums of subrings and additive subgroups ⋮ Note on algebras which are sums of two PI subalgebras ⋮ On sums of \textit{gr}-PI algebras ⋮ A primitive ring which is a sum of two Wedderburn radical subrings ⋮ Solvability and nilpotency of Novikov algebras ⋮ Rings which are sums of PI subrings ⋮ AN ANALOGUE OF KEGEL'S THEOREM FOR QUASI-ASSOCIATIVE ALGEBRAS ⋮ On the generalized Lie structure of associative algebras ⋮ Unital decompositions of the matrix algebra of order three ⋮ Rings that are sums of two locally nilpotent subrings, II ⋮ A sum of two locally nilpotent rings may be not nil ⋮ RINGS WHICH ARE SUMS OF TWO SUBRINGS SATISFYING POLYNOMIAL IDENTITIES ⋮ Lie algebras, decomposable into a sum of an Abelian and a nilpotent subalgebra ⋮ Lie algebras, decomposable into a sum of an Abelian and a nilpotent subalgebra ⋮ Embeddings into simple associative algebras ⋮ Decompositions of algebras and post-associative algebra structures ⋮ Note on rings which are sums of a subring and an additive subgroup ⋮ Simple locally bicompact rings. ⋮ Radikale und Sockel ⋮ Nilpotence of nil subrings implies more general nilpotence ⋮ Rings that are sums of two locally nilpotent subrings ⋮ On rings that are sums of two subrings ⋮ Rings which are sums of two subrings ⋮ Sums of simple subalgebras
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