Lifting modules with finite internal exchange property and direct sums of hollow modules
Y Kuratomi - Journal of Algebra and Its Applications, 2021 - World Scientific
A module M is said to be lifting if, for any submodule X of M, there exists a decomposition M=
A⊕ B such that A⊆ X and X/A is a small submodule of M/A. A lifting module is defined as a …
A⊕ B such that A⊆ X and X/A is a small submodule of M/A. A lifting module is defined as a …
Lifting modules with finite internal exchange property and direct sums of hollow modules
Y Kuratomi - Journal of Algebra and Its Applications, 2020 - cir.nii.ac.jp
抄録< jats: p> A module [Formula: see text] is said to be lifting if, for any submodule [Formula:
see text] of [Formula: see text], there exists a decomposition [Formula: see text] such that …
see text] of [Formula: see text], there exists a decomposition [Formula: see text] such that …
Lifting modules with finite internal exchange property and direct sums of hollow modules.
Y Kuratomi - Journal of Algebra & Its Applications, 2021 - search.ebscohost.com
A module M is said to be lifting if, for any submodule X of M, there exists a decomposition M=
A⊕ B such that A⊆ X and X/A is a small submodule of M/A. A lifting module is defined as a …
A⊕ B such that A⊆ X and X/A is a small submodule of M/A. A lifting module is defined as a …