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<Emphasis Type="Italic">UA</Emphasis>-properties of modules over commutative Noetherian rings |
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| Authors: | O V Lyubimtsev D S Chistyakov |
| Abstract: | A semigroup (R, ·) is said to be a UA-ring if there exists a unique binary operation “+” transforming (R, ·, +) into a ring. An R-module A is said to be a UA-module if it is not possible to define a new addition in A without changing the action of R on A. In this paper we investigate topics that are related to the structure of UA-rings of endomorphisms and UA-modules over commutative Noetherian rings. |
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