The Osofsky-Smith Theorem for Modular Lattices, and Applications (II)
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Publication:5412105
DOI10.1080/00927872.2013.770520zbMath1285.06003OpenAlexW4237390464MaRDI QIDQ5412105
Publication date: 25 April 2014
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00927872.2013.770520
Torsion theories; radicals on module categories (associative algebraic aspects) (16S90) Continuous lattices and posets, applications (06B35) Modular lattices, Desarguesian lattices (06C05)
Related Items (11)
On the De Morgan's laws for modules ⋮ New results on \(C_{11}\) and \(C_{12}\) lattices with applications to Grothendieck categories and torsion theories ⋮ Relativization, absolutization, and latticization in ring and module theory ⋮ Attaching topological spaces to a module. I: sobriety and spatiality ⋮ Fully invariant-extending modular lattices, and applications. I. ⋮ Modular C11 lattices and lattice preradicals ⋮ The conditions (Ci) in modular lattices, and applications ⋮ The conditions (𝐂ᵢ),𝐢=1,2,3,11,12, in rings, modules, categories, and lattices ⋮ Lattice preradicals with applications to Grothendieck categories and torsion theories. ⋮ Singular and nonsingular modules relative to a torsion theory ⋮ Comultiplication modules relative to a hereditary torsion theory
Cites Work
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- On \(\tau\)-extending modules.
- Relatively extending modules.
- An indecomposable nonlocally finitely generated Grothendieck category with simple objects
- On commutative Grothendieck categories having a Noetherian cogenerator
- Cyclic modules whose quotients have all complement submodules direct summands
- Dual Krull dimension and quotient finite dimensionality
- CS modules relative to a torsion theory.
- The Osofsky–Smith Theorem for Modular Lattices and Applications (I)
- Spectral gabriel topologies and relative singular functors
- ON THE OSOFSKY–SMITH THEOREM
- Extending modules relative to a torsion theory
- On the relative (quasi-) continuity of modules
- Modules complemented with respect to a torsion theory
- Modules which are extending relative to module classes
- Localization of modular lattices, Krull dimension, and the Hopkins-Levitzki theorem (I)
- Σ-Extending Modules, Σ-Lifting Modules, and Proper Classes
- Modules whose closed submodules are finitely generated
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