Control subgroups and birational extensions of graded rings.

Hussein, Salah El Din S.

Displaying similar documents to “Control subgroups and birational extensions of graded rings.”

A note on centralizers.

Bell, Howard E. (2000)

International Journal of Mathematics and Mathematical Sciences

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Compatible ideals and radicals of Ore extensions.

Hashemi, E. (2006)

The New York Journal of Mathematics [electronic only]

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On McCoy condition and semicommutative rings

Mohamed Louzari (2013)

Commentationes Mathematicae Universitatis Carolinae

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Let $R$ be a ring and $σ$ an endomorphism of $R$ . We give a generalization of McCoy’s Theorem [ Annihilators in polynomial rings, Amer. Math. Monthly 64 (1957), 28–29] to the setting of skew polynomial rings of the form $R [x; σ]$ . As a consequence, we will show some results on semicommutative and $σ$ -skew McCoy rings. Also, several relations among McCoyness, Nagata extensions and Armendariz rings and modules are studied.

Real closed rings, I. Residue rings of rings of continuous functions

Gregory Cherlin, Max Dickmann (1986)

Fundamenta Mathematicae

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Filial rings

Ehrlich, Gertrude (1983-1984)

Portugaliae mathematica

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Homogeneous Ideal Decompositions in General Graded Rings with ACC.

E.M. STROHMEIER (1969)

Mathematische Annalen

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Alternative rings in which every proper right ideal is maximal

A. Widiger (1983)

Fundamenta Mathematicae

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Work of Pere Menal on normal subgroups.

Frank A. Arlinghaus, Leonid L. Vaserstein (1992)

Publicacions Matemàtiques

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We describe subgroups of GLA which are normalized by elementary matrices for rings A satisfying the first stable range condition, Banach algebras A, von Neumann regular rings A, and other rings A.

Substructures and radicals of Morita contexts for near-rings and Morita near-rings.

Veldsman, Stefan (1994)

Mathematica Pannonica

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