The s-finiteness on quotient rings of a polynomial ring

Jung Wook Lim; Jung Yoog Kang

doi:10.14317/jami.2021.617

The s-finiteness on quotient rings of a polynomial ring

Jung Wook Lim, Jung Yoog Kang

Silla University

Research output: Contribution to journal › Article › peer-review

Abstract

Let R be a commutative ring with identity, R[X] the polynomial ring over R and S a multiplicative subset of R. Let U = {f ∈ R[X] | f is monic} and let N = {f ∈ R[X] | c(f) = R}. In this paper, we show that if S is an anti-Archimedean subset of R, then R is an S-Noetherian ring if and only if R[X]_U is an S-Noetherian ring, if and only if R[X]_N is an S-Noetherian ring. We also prove that if R is an integral domain and R[X]_U is an S-principal ideal domain, then R is an S-principal ideal domain.

Original language	English
Pages (from-to)	617-622
Number of pages	6
Journal	Journal of Applied Mathematics and Informatics
Volume	39
Issue number	5-6
DOIs	https://doi.org/10.14317/jami.2021.617
State	Published - 2021

Keywords

Nagata ring
S-finite
S-Noetherian ring
S-principal
S-principal ideal ring
Serre’s conjecture ring

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10.14317/jami.2021.617

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title = "The s-finiteness on quotient rings of a polynomial ring",

abstract = "Let R be a commutative ring with identity, R[X] the polynomial ring over R and S a multiplicative subset of R. Let U = {f ∈ R[X] | f is monic} and let N = {f ∈ R[X] | c(f) = R}. In this paper, we show that if S is an anti-Archimedean subset of R, then R is an S-Noetherian ring if and only if R[X]U is an S-Noetherian ring, if and only if R[X]N is an S-Noetherian ring. We also prove that if R is an integral domain and R[X]U is an S-principal ideal domain, then R is an S-principal ideal domain.",

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language = "English",

volume = "39",

pages = "617--622",

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T1 - The s-finiteness on quotient rings of a polynomial ring

AU - Lim, Jung Wook

AU - Kang, Jung Yoog

PY - 2021

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AB - Let R be a commutative ring with identity, R[X] the polynomial ring over R and S a multiplicative subset of R. Let U = {f ∈ R[X] | f is monic} and let N = {f ∈ R[X] | c(f) = R}. In this paper, we show that if S is an anti-Archimedean subset of R, then R is an S-Noetherian ring if and only if R[X]U is an S-Noetherian ring, if and only if R[X]N is an S-Noetherian ring. We also prove that if R is an integral domain and R[X]U is an S-principal ideal domain, then R is an S-principal ideal domain.

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KW - S-finite

KW - S-Noetherian ring

KW - S-principal

KW - S-principal ideal ring

KW - Serre’s conjecture ring

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JF - Journal of Applied Mathematics and Informatics

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ER -

The s-finiteness on quotient rings of a polynomial ring

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Keywords

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