Finitely embedded modules over Noetherian rings

Ginn, S. M.; Moss, P. B.

doi:10.1090/s0002-9904-1975-13831-6

Cited by 17 publications

(6 citation statements)

References 5 publications

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“…The result announced in [3] follows easily from n v ...,n k eN such that RN = Rn l + ...+Rn k . Thus There is then a right i?-module embedding:…”

Section: Let M R Be a Finitely Generated Non-artinian R-module And Lementioning

confidence: 90%

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A Decomposition Theorem for Noetherian orders in Artinian Rings

Ginn

Moss

1977

Bulletin of the London Mathematical Society

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“…The result announced in [3] follows easily from n v ...,n k eN such that RN = Rn l + ...+Rn k . Thus There is then a right i?-module embedding:…”

Section: Let M R Be a Finitely Generated Non-artinian R-module And Lementioning

confidence: 90%

“…This gives S 2 (CT) s (ST) 2 . Since CT eJ there exists (^ e / such that S 3 C x s (ST)3 . Continuing in this way gives eventually S P B £ (ST) P = 0 for some BeJ.lt follows that S p ^ A.THEOREM 9.…”

mentioning

confidence: 99%

A Decomposition Theorem for Noetherian orders in Artinian Rings

Ginn

Moss

1977

Bulletin of the London Mathematical Society

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“…It is well known that over a commutative ring, every Noetherian module with essential socle is Artinian. Although this is not true for arbitrary right Noetherian rings, some positive results have been obtained by Ginn and Moss [6] when the ring is right and left Noetherian. Johns [7,Theorem 1], by using a result of Kurshan [8,Theorem 3.3], showed that a right Noetherian ring is right Artinian, provided that every right ideal is a right annihilator.…”

Section: Introductionmentioning

confidence: 96%

A counter example to a conjecture of Johns

Faith¹,

Menal²

1992

Proc. Amer. Math. Soc.

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In this paper, we construct a counter example to a conjecture of Johns to the effect that a right Noetherian ring in which every right ideal is an annihilator is right Artinian. Our example requires the existence of a right Noetherian domain A (not a field) with a unique simple right module W such that WA is injective and A embeds in the endomorphism ring End(WA). Then the counter example is the trivial extension R = A x W of A and W. The ring A exists by a theorem of Resco using a theorem of Cohn. Specifically, if D is any countable existentially closed field with center k , then the right and left principal ideal domain defined by A = D®k k(x), where k(x) is the field of rational functions, has the desired properties, with WA « DA .

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“…Although this is not true for arbitrary right Noetherian rings, some positive results have been obtained by Ginn and Moss [6] when the ring is right and left Noetherian. Johns [7,Theorem 1], by using a result of Kurshan [8,Theorem 3.3], showed that a right Noetherian ring is right Artinian, provided that every right ideal is a right annihilator.…”

Section: Introductionmentioning

confidence: 96%

A Counter Example to a Conjecture of Johns

Faith¹,

Menal²

1992

Proceedings of the American Mathematical Society

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Abstract.In this paper, we construct a counter example to a conjecture of Johns to the effect that a right Noetherian ring in which every right ideal is an annihilator is right Artinian. Our example requires the existence of a right Noetherian domain A (not a field) with a unique simple right module W such that WA is injective and A embeds in the endomorphism ring End(WA). Then the counter example is the trivial extension R = A x W of A and W . The ring A exists by a theorem of Resco using a theorem of Cohn. Specifically, if D is any countable existentially closed field with center k , then the right and left principal ideal domain defined by A = D®k k(x), where k(x) is the field of rational functions, has the desired properties, with WA « DA .

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Finitely embedded modules over Noetherian rings

Cited by 17 publications

References 5 publications

A Decomposition Theorem for Noetherian orders in Artinian Rings

A Decomposition Theorem for Noetherian orders in Artinian Rings

A counter example to a conjecture of Johns

A Counter Example to a Conjecture of Johns

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