"Derived functor"의 두 판 사이의 차이

2021년 2월 17일 (수) 01:36 기준 최신판

basic tool to define cohomology theory
extend a left invariant functor to get a derived functor
then we get a cohomology theory
e.g. sheaf cohomology of a topological space X with coefficients in a sheaf \(\mathcal F\) = the right derived functor of the global section functor

\[ \mathcal F \mapsto H^{0}(X, \mathcal F) \]

\[ M\mapsto M^{G} \]

@@ 3번째 줄: / 3번째 줄: @@
 * extend a left invariant functor to get a derived functor
 * then we get a cohomology theory
-* e.g. sheaf cohomology of a topological space X with coefficients in a sheaf $\mathcal F$ = the right derived functor of the global section functor
+* e.g. sheaf cohomology of a topological space X with coefficients in a sheaf <math>\mathcal F</math> = the right derived functor of the global section functor
 ==left invariant functors==
 ===global section functor===
-* a functor from sheaves on $X$ to abelian groups defined by
+* a functor from sheaves on <math>X</math> to abelian groups defined by
-$$
+:<math>
 \mathcal F \mapsto H^{0}(X, \mathcal F)
-$$
+</math>
 ===invariants===
-* $G$ : group
+* <math>G</math> : group
-* from modules of $G$ to abelian groups
+* from modules of <math>G</math> to abelian groups
-$$
+:<math>
 M\mapsto M^{G}
-$$
+</math>
+==related items==
+* [[Ext functor]]
+* [[Free resolutions]]
 [[분류:Abstract concepts]]
+[[분류:migrate]]
+==메타데이터==
+===위키데이터===
+* ID :  [https://www.wikidata.org/wiki/Q320245 Q320245]
+===Spacy 패턴 목록===
+* [{'LOWER': 'derived'}, {'LEMMA': 'functor'}]