When every endomorphism of a Σ-injective module is a sum of two commuting automorphisms
From MaRDI portal
Publication:5239138
DOI10.1090/conm/727/14646zbMath1426.16031OpenAlexW2937536206MaRDI QIDQ5239138
Publication date: 22 October 2019
Published in: Contemporary Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1090/conm/727/14646
Injective modules, self-injective associative rings (16D50) Automorphisms and endomorphisms (16W20) Units, groups of units (associative rings and algebras) (16U60)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Injective modules over Noetherian rings
- When is every linear transformation a sum of two commuting invertible ones?
- Automorphism-invariant modules satisfy the exchange property.
- Lectures on injective modules and quotient rings
- On the endomorphism ring of an abelian p-group and of a large subgroup
- Sums of automorphisms of a primary abelian group
- La théorie de Galois des anneaux simples et semi-simples
- RIGHT SELF-INJECTIVE RINGS IN WHICH EVERY ELEMENT IS A SUM OF TWO UNITS
- New characterization of $\Sigma $-injective modules
- Injective Dimension in Noetherian Rings
- Dedekind-Finite Strongly Clean Rings
- Rings with Ascending Condition on Annihilators
- On Endomorphisms of Primary Abelian Groups
- Endomorphism rings of Abelian groups generated by automorphism groups
- Automorphisms of Simple Algebras
- An Ideal-Theoretic Characterization of the Ring of All Linear Transformations
- Every Linear Transformation is a Sum of Nonsingular Ones
This page was built for publication: When every endomorphism of a Σ-injective module is a sum of two commuting automorphisms
