Wang's theorem for one-dimensional local rings

Journal of the Mathematical Society of Japan

Online ISSN : 1881-1167
Print ISSN : 0025-5645
ISSN-L : 0025-5645

Wang's theorem for one-dimensional local rings

Jun Horiuchi, Hideto Sakurai

著者情報

キーワード: parameter ideal, quasi-socle ideal, Cohen-Macaulay local ring, Buchsbaum local ring

ジャーナルフリー

2014 年 66 巻 2 号 p. 641-646

DOI https://doi.org/10.2969/jmsj/06620641

詳細

抄録

In this article, we show that, Q:_A 𝔪^t ⊆ 𝔪^t for all integers t > 0, and for all parameter ideals Q ⊆ 𝔪^2t−1 in a one-dimensional Cohen-Macaulay local ring (A,𝔪) provided that A is not a regular local ring. The assertion obtained by Wang can be extended to one-dimensional (hence, arbitrary dimensional) local rings after some mild modifications. We refer to these quotient ideals I = Q:_A 𝔪^t, t-th quasi-socle ideals of Q. Examples are explored.

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© 2014 The Mathematical Society of Japan

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