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In the branch of mathematics called category theory, a hopfian object is an object ''A'' such that any epimorphism of ''A'' onto ''A'' is necessarily an automorphism. The dual notion is that of a cohopfian object, which is an object ''B'' such that every monomorphism from ''B'' into ''B'' is necessarily an automorphism. The two conditions have been studied in the categories of groups, rings, modules, and topological spaces. The terms "hopfian" and "cohopfian" have arisen since the 1960s, and are said to be in honor of Heinz Hopf and his use of the concept of the hopfian group in his work on fundamental groups of surfaces. ==Properties== Both conditions may be viewed as types of finiteness conditions in their category. For example, assuming Zermelo–Fraenkel set theory with the axiom of choice and working in the category of sets, the hopfian and cohopfian objects are precisely the finite sets. From this it is easy to see that all finite groups, finite modules and finite rings are hopfian and cohopfian in their categories. Hopfian objects and cohopfian objects have an elementary interaction with projective objects and injective objects. The two results are: *An injective hopfian object is cohopfian. *A projective cohopfian object is hopfian. The proof for the first statement is short: Let ''A'' be and injective hopfian object, and let ''f'' be an injective morphism from ''A'' to ''A''. By injectivity, ''f'' factors through the identity map ''I''''A'' on ''A'', yielding a morphism ''g'' such that ''gf''=''I''''A''. As a result, ''g'' is a surjective morphism and hence an automorphism, and then ''f'' is necessarily the inverse automorphism to ''g''. This proof can be dualized to prove the second statement. 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Hopfian object」の詳細全文を読む スポンサード リンク
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