Invertible ideals of the ring of integral valued polynomials
作者:
Jean-Luc Chabert,
期刊:
Communications in Algebra
(Taylor Available online 1995)
卷期:
Volume 23,
issue 12
页码: 4461-4471
ISSN:0092-7872
年代: 1995
DOI:10.1080/00927879508825477
出版商: Marcel Dekker, Inc.
数据来源: Taylor
摘要:
If A is the ring of integers of a number field, then every invertible ideal of the ring Int(A) of integral valued polynomials on A may be generated by two elements. The question was raised to know whether this assertion holds when A is an order of a number field. We answer affirmatively in the case where A is locally analytically irreducible
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