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Statements

Subject Item
dbr:∞-groupoid
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단체 준군 ∞-groupoid
rdfs:comment
In category theory, a branch of mathematics, an ∞-groupoid is an abstract homotopical model for topological spaces. One model uses Kan complexes which are fibrant objects in the category of simplicial sets (with the standard model structure). It is an ∞-category generalization of a groupoid, a category in which every morphism is an isomorphism. The homotopy hypothesis states that ∞-groupoids are spaces. 호모토피 이론에서 단체 준군(單體準群, 영어: simplicial groupoid, simplicially enriched groupoid)은 단체 집합의 모노이드 범주에 대하여 풍성한 범주를 이루는 준군이다.:§Ⅴ
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In category theory, a branch of mathematics, an ∞-groupoid is an abstract homotopical model for topological spaces. One model uses Kan complexes which are fibrant objects in the category of simplicial sets (with the standard model structure). It is an ∞-category generalization of a groupoid, a category in which every morphism is an isomorphism. The homotopy hypothesis states that ∞-groupoids are spaces. 호모토피 이론에서 단체 준군(單體準群, 영어: simplicial groupoid, simplicially enriched groupoid)은 단체 집합의 모노이드 범주에 대하여 풍성한 범주를 이루는 준군이다.:§Ⅴ
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