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Generating Ideals in Rings of Integer-Valued Polynomials

Published online by Cambridge University Press:  20 November 2018

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Abstract

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Let $R$ be a one-dimensional locally analytically irreducible Noetherian domain with finite residue fields. In this note it is shown that if $I$ is a finitely generated ideal of the ring $\text{Int(}R)$ of integer-valued polynomials such that for each $\text{x}\,\in \,R$ the ideal $I\text{(}x\text{)}=\{f(x)|f\in I\}$ is strongly $\text{n}$-generated, $n\,\ge \,2$, then $I$ is $\text{n}$-generated, and some variations of this result.

Keywords

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1999

References

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