noether环上的弱(σ， δ)-刚性环

Pub Date : 2020-07-01 DOI:10.2478/ausm-2020-0001

V. K. Bhat, P. Singh, S. Sharma

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引用次数: 0

摘要

摘要设R是一个noether积分定义域，该定义域也是一个代数在π (π是有理数域)上。让σ是一个endo-morphism R和δσ推导R .我们回想一下,一个环R是一个弱(σδ)刚性环如果(σ(a) +δ(a))∈N (R)当且仅当一个∈N (R)∈R (N (R)是幂零的元素的集合R)。这个我们证明如果R是诺特积分域也是一个代数ℚ,σR的一个自同构和δσ推导R, R是一个弱(σδ)刚性环,则完全半素N (R)。

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On weak (σ, δ)-rigid rings over Noetherian rings

Abstract Let R be a Noetherian integral domain which is also an algebra over ℚ (ℚ is the field of rational numbers). Let σ be an endo-morphism of R and δ a σ-derivation of R. We recall that a ring R is a weak (σ, δ)-rigid ring if a(σ(a)+ δ(a)) ∈ N(R) if and only if a ∈ N(R) for a ∈ R (N(R) is the set of nilpotent elements of R). With this we prove that if R is a Noetherian integral domain which is also an algebra over ℚ, σ an automorphism of R and δ a σ-derivation of R such that R is a weak (σ, δ)-rigid ring, then N(R) is completely semiprime.

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