论模范畴中素根的幂零性

IF 0.3 Q4 MATHEMATICS, APPLIED Algebra & Discrete Mathematics Pub Date : 2021-01-01 DOI:10.12958/adm1634

C. Arellano, J. Castro, J. Ríos

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引用次数: 1

摘要

对于M∈R-Mod和σ[M]上的一个遗传扭转理论，我们利用Raggi等人定义的素数和半素数模的概念引入了τ-纯素数根Nτ(M)=Nτ作为M的所有τ-纯素数子模的交的概念，并给出了Nτ(M)的τ-零幂的充分必要条件。我们证明了如果M是一个有限生成的r模，σ[M]且χ≠τ中的生成子是fis不变扭转理论，使得M具有τ- krull维数，则Nτ是τ-幂零的。

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On the nilpotence of the prime radical in module categories

For M∈R-Mod and τ a hereditary torsion theory on the category σ[M] we use the concept of prime and semiprime module defined by Raggi et al. to introduce the concept of τ-pure prime radical Nτ(M)=Nτ as the intersection of all τ-pure prime submodules of M. We give necessary and sufficient conditions for the τ-nilpotence of Nτ(M). We prove that if M is a finitely generated R-module, progenerator in σ[M] and χ≠τ is FIS-invariant torsion theory such that M has τ-Krull dimension, then Nτ is τ-nilpotent.

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