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dc.contributor.author Kafkas, G.
dc.contributor.author Ungor, B.
dc.contributor.author Halicioglu, S.
dc.contributor.author Harmanci, A.
dc.date.accessioned 2019-06-15T20:29:23Z
dc.date.available 2019-06-15T20:29:23Z
dc.date.issued 2011
dc.identifier.citation Generalized symmetric rings / G. Kafkas, B. Ungor, S. Halicioglu, A. Harmanci // Algebra and Discrete Mathematics. — 2011. — Vol. 12, № 2. — С. 72–84. — Бібліогр.: 21 назв. — англ. uk_UA
dc.identifier.issn 1726-3255
dc.identifier.other 2010 Mathematics Subject Classification:13C99, 16D80, 16U80
dc.identifier.uri http://dspace.nbuv.gov.ua/handle/123456789/154759
dc.description.abstract In this paper, we introduce a class of rings which is a generalization of symmetric rings. Let R be a ring with identity. A ring R is called central symmetric if for any a, b,c∈R, abc=0 implies bac belongs to the center of R. Since every symmetric ring is central symmetric, we study sufficient conditions for central symmetric rings to be symmetric. We prove that some results of symmetric rings can be extended to central symmetric rings for this general settings. We show that every central reduced ring is central symmetric, every central symmetric ring is central reversible, central semmicommutative, 2-primal, abelian and so directly finite. It is proven that the polynomial ring R[x] is central symmetric if and only if the Laurent polynomial ring R[x,x−1] is central symmetric. Among others, it is shown that for a right principally projective ring R, R is central symmetric if and only if R[x]/(xn) is central Armendariz, where n≥2 is a natural number and (xn) is the ideal generated by xn uk_UA
dc.language.iso en uk_UA
dc.publisher Інститут прикладної математики і механіки НАН України uk_UA
dc.relation.ispartof Algebra and Discrete Mathematics
dc.title Generalized symmetric rings uk_UA
dc.type Article uk_UA
dc.status published earlier uk_UA


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