DECOMPOSITIONS OF 2 x 2 MATRICES OVER LOCAL RINGS

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saithalıcıoglu.pdf (162.83 KB)

Tarih

2016

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Dergi Başlığı

Dergi ISSN

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Yayıncı

PUBLICATIONS L INSTITUT MATHEMATIQUE MATEMATICKI

Erişim Hakkı

info:eu-repo/semantics/openAccess

Özet

An element a of a ring R is called perfectly clean if there exists an idempotent e is an element of comm(2) (a) such that a - e is an element of U(R). A ring R is perfectly clean in case every element in R is perfectly clean. In this paper, we completely determine when every 2 x 2 matrix and triangular matrix over local rings are perfectly clean. These give more explicit characterizations of strongly clean matrices over local rings. We also obtain several criteria for a triangular matrix to be perfectly J-clean. For instance, it is proved that for a commutative local ring R, every triangular matrix is perfectly J-clean in T-n (R) if and only if R is strongly J-clean.

Açıklama

WOS: 000398279100021

Anahtar Kelimeler

perfectly clean ring, perfectly J-clean ring, quasipolar ring, matrix, triangular matrix

Kaynak

PUBLICATIONS DE L INSTITUT MATHEMATIQUE-BEOGRAD

WoS Q Değeri

N/A

Scopus Q Değeri

Q4

Cilt

100

Sayı

114

Künye

Bağlantı

https://dx.doi.org/10.2298/PIM1614287C
 https://hdl.handle.net/20.500.12513/2738

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