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Anwar, Yunita Septriana; Wijayanti, Indah Emilia; Surodjo, Budi; Sari, Dewi Kartika

On topological \(M\)-injective modules. (English) Zbl 1527.16004

Topology Appl. 334, Article ID 108539, 10 p. (2023).
A topological module \(U\) over a topological ring \(R\) is called topological injective if for every topological \(R\)-module \(M\), every open submodule \(K\) of \(M\), every continuous monomorphism \(f:K\rightarrow M\) and every continuous homomorphism \(g:K\rightarrow U\), there exists a continuous homomorphism \(h:M\rightarrow U\) such that \(hf=g\).
Several researchers have tried to find sufficient and necessary conditions under which an infinite direct sum of topological injective modules is also topological injective. This problem has been solved partially only for the case when the topolgy on modules is discrete.
The authors of the present paper introduce a subclass of topological injective modules, called topological \(M\)-injective modules, and show that if the infinite direct sum of topological \(M\)-injective modules is an open submodule of the direct product of the same modules, then the direct sum is also a topological \(M\)-injective module.
For a fixed topological ring \(R\) and a fixed topological \(R\)-module \(M\), a topological \(R\)-module \(U\) is called a topological \(M\)-injective module if for every open submodule \(K\) of \(M\), every continuous monomorphism \(f:K\rightarrow M\) and every continuous homomorphism \(g:K\rightarrow U\), there exists a continuous homomorphism \(h:M\rightarrow U\) such that \(hf=g\).
Reviewer: Mart Abel (Tartu)

MSC:

16D50 Injective modules, self-injective associative rings
16W80 Topological and ordered rings and modules
20K25 Direct sums, direct products, etc. for abelian groups

Keywords:

topological \(M\)-injective modules; direct sum of topological \(M\)-injective modules; topological modules; direct sum of topological modules; direct product of topological modules
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References:

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