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- Endomorphism_ring abstract "In abstract algebra, the endomorphism ring of an abelian group X, denoted by End(X), is the set of all homomorphisms of X into itself. The addition operation is defined by pointwise addition of functions and the multiplication operation is defined by function composition.The functions involved are restricted to what is defined as a homomorphism in the context, which depends upon the category of the object under consideration. The endomorphism ring consequently encodes several internal properties of the object. As the resulting object is often an algebra over some ring R, this may also be called the endomorphism algebra.".
- Endomorphism_ring wikiPageID "59623".
- Endomorphism_ring wikiPageRevisionID "603249615".
- Endomorphism_ring hasPhotoCollection Endomorphism_ring.
- Endomorphism_ring id "p/e035610".
- Endomorphism_ring title "Endomorphism ring".
- Endomorphism_ring subject Category:Category_theory.
- Endomorphism_ring subject Category:Module_theory.
- Endomorphism_ring subject Category:Ring_theory.
- Endomorphism_ring comment "In abstract algebra, the endomorphism ring of an abelian group X, denoted by End(X), is the set of all homomorphisms of X into itself. The addition operation is defined by pointwise addition of functions and the multiplication operation is defined by function composition.The functions involved are restricted to what is defined as a homomorphism in the context, which depends upon the category of the object under consideration.".
- Endomorphism_ring label "Endomorphism ring".
- Endomorphism_ring label "Pierścień endomorfizmów".
- Endomorphism_ring sameAs Pierścień_endomorfizmów.
- Endomorphism_ring sameAs m.0g7b4.
- Endomorphism_ring sameAs Q2896709.
- Endomorphism_ring sameAs Q2896709.
- Endomorphism_ring wasDerivedFrom Endomorphism_ring?oldid=603249615.
- Endomorphism_ring isPrimaryTopicOf Endomorphism_ring.