Isomorphisms of certain locally nilpotent finitary groups and associated rings

Feride Kuzucuoglu; Vladimir M. Levchuk

doi:10.1023/B:ACAP.0000027533.59937.14

Isomorphisms of certain locally nilpotent finitary groups and associated rings

Feride Kuzucuoglu
, Vladimir M. Levchuk

Cebir ve Sayılar Teorisi Anabilim Dalı

Siberian Federal University

Araştırma sonucu: Dergiye katkı › Makale › bilirkişi

15 Alıntılar (Scopus)

Özet

For any chain Γ the ring NT(Γ, K) of all finitary Γ-matrices ∥a_ij∥_i,jεΓ over an associative ring K with zeros on and above the main diagonal is locally nilpotent and hence radical. If R′ = NT(Γ′, K′), R = NT(Γ, K) and either |Γ| < ∞ or K is a ring with no zero-divisors, then isomorphisms between rings R and R′, their adjoint groups and associated Lie rings are described. chain, finitary matrix, radical ring, adjoint group, associated Lie ring, isomorphism.

Orijinal dil	İngilizce
Sayfa (başlangıç-bitiş)	169-181
Sayfa sayısı	13
Dergi	Acta Applicandae Mathematicae
Hacim	82
Basın numarası	2
DOI'lar	https://doi.org/10.1023/B:ACAP.0000027533.59937.14
Yayın durumu	Yayınlandı - Haz 2004

Belgeye Erişim

10.1023/B:ACAP.0000027533.59937.14

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Link to publication in Scopus

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abstract = "For any chain Γ the ring NT(Γ, K) of all finitary Γ-matrices ∥aij∥i,jεΓ over an associative ring K with zeros on and above the main diagonal is locally nilpotent and hence radical. If R′ = NT(Γ′, K′), R = NT(Γ, K) and either |Γ| < ∞ or K is a ring with no zero-divisors, then isomorphisms between rings R and R′, their adjoint groups and associated Lie rings are described. chain, finitary matrix, radical ring, adjoint group, associated Lie ring, isomorphism.",

author = "Feride Kuzucuoglu and Levchuk, \{Vladimir M.\}",

year = "2004",

month = jun,

doi = "10.1023/B:ACAP.0000027533.59937.14",

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AU - Kuzucuoglu, Feride

AU - Levchuk, Vladimir M.

PY - 2004/6

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N2 - For any chain Γ the ring NT(Γ, K) of all finitary Γ-matrices ∥aij∥i,jεΓ over an associative ring K with zeros on and above the main diagonal is locally nilpotent and hence radical. If R′ = NT(Γ′, K′), R = NT(Γ, K) and either |Γ| < ∞ or K is a ring with no zero-divisors, then isomorphisms between rings R and R′, their adjoint groups and associated Lie rings are described. chain, finitary matrix, radical ring, adjoint group, associated Lie ring, isomorphism.

AB - For any chain Γ the ring NT(Γ, K) of all finitary Γ-matrices ∥aij∥i,jεΓ over an associative ring K with zeros on and above the main diagonal is locally nilpotent and hence radical. If R′ = NT(Γ′, K′), R = NT(Γ, K) and either |Γ| < ∞ or K is a ring with no zero-divisors, then isomorphisms between rings R and R′, their adjoint groups and associated Lie rings are described. chain, finitary matrix, radical ring, adjoint group, associated Lie ring, isomorphism.

UR - https://www.scopus.com/pages/publications/3543118410

U2 - 10.1023/B:ACAP.0000027533.59937.14

DO - 10.1023/B:ACAP.0000027533.59937.14

M3 - Article

AN - SCOPUS:3543118410

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VL - 82

SP - 169

EP - 181

JO - Acta Applicandae Mathematicae

JF - Acta Applicandae Mathematicae

IS - 2

ER -

Isomorphisms of certain locally nilpotent finitary groups and associated rings

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