Abstract
We introduce two classes of radicals by means of tensor product of modules and module homomorphisms and prove some properties of these radicals and their connection with attracting modules.
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References
Pierce R. S., “E-modules,” Contemp. Math., 87, 221-240 (1989).
Bowshell R. A. and Schultz P., “Unital rings whose additive endomorphisms commute,” Math. Ann., 228, 197-214 (1977).
Krylov P. A. and Prikhodovskii M. A., “Generalized T-modules and E-modules,” in: Universal Algebra and Some of Their Applications [in Russian], Peremena, Volgograd, 1999, pp. 153-169.
Mishina A. P. and Skornyakov L. A., Abelian Groups and Modules [in Russian], Nauka, Moscow (1969).
Kashu A. I., Radicals and Module Torsions, Shtiintsa, Kishinev (1983).
Kasch F., Modules and Rings [Russian translation], Mir, Moscow (1981).
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Timoshenko, E.A. T-Radicals and E-Radicals in the Category of Modules. Siberian Mathematical Journal 45, 165–172 (2004). https://doi.org/10.1023/B:SIMJ.0000013022.52517.d8
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DOI: https://doi.org/10.1023/B:SIMJ.0000013022.52517.d8