环扩展的消去理想

IF 0.3 Q4 MATHEMATICS, APPLIED Algebra & Discrete Mathematics Pub Date : 2021-01-01 DOI:10.12958/adm1424

S. Tchamna

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引用次数: 0

摘要

研究了环扩展对消理想的性质。设R为一个环延伸。对于S的两个S-正则(有限生成)子模B和C，当IB=IC时，则B=C，则R的非零S-正则理想I称为环扩展R的(拟)对消理想。证明了一个有限生成的理想I是环扩展R的一个对消理想当且仅当I是S可逆的。

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Cancellation ideals of a ring extension

We study properties of cancellation ideals of ring extensions. Let R⊆S be a ring extension. A nonzero S-regular ideal I of R is called a (quasi)-cancellation ideal of the ring extension R⊆S if whenever IB=IC for two S-regular (finitely generated) R-submodules B and C of S, then B=C. We show that a finitely generated ideal I is a cancellation ideal of the ring extension R⊆S if and only if I is S-invertible.

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