On radicals of rings which are sums of two subrings
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Publication:1924599
DOI10.1007/BF01323977zbMath0860.16016OpenAlexW2074042189MaRDI QIDQ1924599
Marek Kępczyk, Edmund R. Puczylowski
Publication date: 18 February 1997
Published in: Archiv der Mathematik (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01323977
nilpotent ringsnil radicalsupernilpotent radicalshereditary radicalssums of two subringsnil rings of bounded index\(N\)-radicalscommutative nil ringsKoethe's problemnil PI ringsprime radical subringsright \(T\)-nilpotent ringsWedderburn radical rings
Nil and nilpotent radicals, sets, ideals, associative rings (16N40) General radicals and associative rings (16N80)
Related Items
On the representation of fields as finite sums of proper subfields, A ring which is a sum of two PI subrings is always a PI ring, On rings which are sums of subrings and additive subgroups, Note on algebras which are sums of two PI subalgebras, Rings which are sums of PI subrings, RINGS WHICH ARE SUMS OF TWO SUBRINGS SATISFYING POLYNOMIAL IDENTITIES, Note on rings which are sums of a subring and an additive subgroup, Rings which are sums of two subrings
Cites Work
- Unnamed Item
- A sum of two locally nilpotent rings may be not nil
- Zur Nilpotenz gewisser assoziativer Ringe
- On rings which are sums of two subrings
- On rings that are sums of two subrings
- Strong radical properties of alternative and associative rings
- Hereditariness of strong and stable radicals
- On Relations among radical properties
- Nil Rings Satisfying Certain Chain Conditions
- Nil Pi-Rings
