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The phantom cover of a module
Authors:Ivo Herzog
Affiliation:The Ohio State University (Lima), Lima, OH 45804, USA
Abstract:A morphism View the MathML source of left R-modules is a phantom morphism if for any morphism View the MathML source, with A finitely presented, the composition fg factors through a projective module. Equivalently, Tor1(X,f)=0 for every right R-module X. It is proved that every R-module possesses a phantom cover, whose kernel is pure injective.If View the MathML source is the category of finitely presented right R-modules modulo projectives, then the association M?Tor1(−,M) is a functor from the category of left R-modules to that of the flat functors on View the MathML source. The phantom cover is used to characterize when this functor is faithful or full. It is faithful if and only if the flat cover of every module has a pure injective kernel; this is equivalent to the flat cover being the phantom cover. The question of fullness is only reasonable when the functor is restricted to the subcategory of cotorsion modules. This restriction is full if and only if every phantom cover of a cotorsion module is pure injective.
Keywords:16B50   16E05   16E30   18G15
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