functor category 中文意思是什麼
functor category
解釋
函子范疇-
This paper defines homology monomorphism, homology epimorphism, homology regular morphism in the category of topological spaces with point by using homology functor
摘要利用同調函子,在點標拓撲空間范疇中定義了同調單態、同調滿態、同調正則態射等概念。 -
By constructing two functor, we have proved a representation theorem of the category stml that the category stml is equivalent with the category fsts, where fsts is consisted of - fuzzifying scott topological spaces and the mappings which are preserving directed - join and way - below relation and continuous. besides, the category stml ( c ) has been discussed, where c is a subcategory of the category of the completely distributive lattices and gohs, c, morphisms are ( 1, 2 ) - smooth continuous goh
構造性地給出一對函子,並以此證明了范疇stml ( l )的一個表示定理,即范疇stml ( l )與范疇fsts ( l ) (由l - fuzzifyingscott拓撲空間與保定向並和way - below關系的l - fuzzifying連續映射所構成的范疇)等價。
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