en>Yobot: WP:CHECKWIKI error fixes using AWB (9615)

2013-11-09T00:19:12Z

WP:CHECKWIKI error fixes using AWB (9615)

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	~~Her title~~ is ~~Felicidad Ahmad~~. ~~Delaware has always been my living place~~ and ~~will never move~~. The ~~favorite hobby for him~~ and ~~his children~~ is to ~~drive~~ and ~~now he~~ is ~~attempting~~ to ~~make cash with it~~. The ~~occupation he~~'~~s been occupying~~ for ~~many years~~ is a ~~messenger~~.<br><br>~~Look into my page~~ - [~~http~~://~~Chatmast~~.~~com~~/~~index~~.~~php?do=~~/~~NLKAntonygbqqzfo~~/~~info~~/ ~~car warranty~~]		In [[homological algebra]] in [[mathematics]], the '''homotopy category''' ''K(A)'' of chain complexes in an [[additive category]] ''A'' is a framework for working with chain homotopies and homotopy equivalences. It lies intermediate between the category of [[chain complexes]] ''Kom(A)'' of ''A'' and the [[derived category]] ''D(A)'' of ''A'' when ''A'' is [[abelian category\|abelian]]; unlike the former it is a [[triangulated category]], and unlike the latter its formation does not require that ''A'' is abelian. Philosophically, while ''D(A)'' makes isomorphisms of any maps of complexes that are [[quasi-isomorphism]]s in ''Kom(A)'', ''K(A)'' does so only for those that are quasi-isomorphisms for a "good reason", namely actually having an inverse up to homotopy equivalence. Thus, ''K(A)'' is more understandable than ''D(A)''.

			== Definitions ==
			Let ''A'' be an [[additive category]]. The homotopy category ''K(A)'' is based on the following definition: if we have complexes ''A'', ''B'' and maps ''f'', ''g'' from ''A'' to ''B'', a '''chain homotopy''' from ''f'' to ''g'' is a collection of maps <math>h^n \colon A^n \to B^{n - 1}</math> (''not'' a map of complexes) such that
			:<math>f^n - g^n = d_B^{n - 1} h^n + h^{n + 1} d_A^n,</math> or simply <math> f - g = d_B h + h d_A.</math>
			This can be depicted as:
			:[[Image:Chain homotopy.svg\|650 px]]
			We also say that ''f'' and ''g'' are '''chain homotopic''', or that <math>f - g</math> is '''null-homotopic''' or '''homotopic to 0'''. It is clear from the definition that the maps of complexes which are null-homotopic form a group under addition.

			The '''homotopy category of chain complexes''' ''K(A)'' is then defined as follows: its objects are the same as the objects of ''Kom(A)'', namely [[chain complex]]es. Its morphisms are "maps of complexes modulo homotopy": that is, we define an equivalence relation
			:<math>f \sim g\ </math> if ''f'' is homotopic to ''g''
			and define
			:<math>\operatorname{Hom}_{K(A)}(A, B) = \operatorname{Hom}_{Kom(A)}(A,B)/\sim</math>
			to be the [[quotient]] by this relation. It is clearer that this results in an additive category if one notes that this is the same as taking the quotient by the subgroup of null-homotopic maps.

			The following variants of the definition are also widely used: if one takes only ''bounded-below'' (''A<sup>n</sup>=0 for n<<0''), ''bounded-above'' (''A<sup>n</sup>=0 for n>>0''), or ''bounded'' (''A<sup>n</sup>=0 for \|n\|>>0'') complexes instead of unbounded ones, one speaks of the ''bounded-below homotopy category'' etc. They are denoted by ''K<sup>+</sup>(A)'', ''K<sup>-</sup>(A)'' and ''K<sup>b</sup>(A)'', respectively.

			A morphism <math>f : A \rightarrow B</math> which is an isomorphism in ''K(A)'' is called a '''homotopy equivalence'''. In detail, this means there is another map <math>g : B \rightarrow A</math>, such that the two compositions are homotopic to the identities: <math>f \circ g \sim Id_B</math> and
			<math>g \circ f \sim Id_A</math>.

			The name "homotopy" comes from the fact that [[homotopic]] maps of [[topological space]]s induce homotopic (in the above sense) maps of [[singular chain]]s.

			== Remarks ==
			Two chain homotopic maps ''f'' and ''g'' induce the same maps on homology because ''(f − g)'' sends [[Chain_complexes#Fundamental_terminology\|cycles]] to [[Chain_complexes#Fundamental_terminology\|boundaries]], which are zero in homology. In particular a homotopy equivalence is a [[quasi-isomorphism]]. (The converse is false in general.) This shows that there is a canonical functor <math>K(A) \rightarrow D(A)</math> to the [[derived category]] (if ''A'' is [[abelian category\|abelian]]).

			== The triangulated structure ==
			The ''shift'' ''A[1]'' of a complex ''A'' is the following complex
			:<math>A[1]: ... \to A^{n+1} \xrightarrow{d_{A[1]}^n} A^{n+2} \to ...</math> (note that <math>(A[1])^n = A^{n + 1}</math>),
			where the differential is <math>d_{A[1]}^n := - d_A^{n+1}</math>.

			For the cone of a morphism ''f'' we take the [[mapping cone (homological algebra)\|mapping cone]]. There are natural maps
			:<math>A \xrightarrow{f} B \to C(f) \to A[1]</math>
			This diagram is called a ''triangle''. The homotopy category ''K(A)'' is a [[triangulated category]], if one defines distinguished triangles to be isomorphic (in ''K(A)'', i.e. homotopy equivalent) to the triangles above, for arbitrary ''A'', ''B'' and ''f''. The same is true for the bounded variants ''K<sup>+</sup>(A)'', ''K<sup>-</sup>(A)'' and ''K<sup>b</sup>(A)''. Although triangles make sense in ''Kom(A)'' as well, that category is not triangulated with respect to these distinguished triangles; for example,
			:<math>X \xrightarrow{id} X \to 0 \to</math>
			is not distinguished since the cone of the identity map is not isomorphic to the complex 0 (however, the zero map <math>C(id) \to 0</math> is a homotopy equivalence, so that this triangle ''is'' distinguished in ''K(A)''). Furthermore, the rotation of a distinguished triangle is obviously not distinguished in ''Kom(A)'', but (less obviously) is distinguished in ''K(A)''. See the references for details.

			==Generalization==
			More generally, the homotopy category ''Ho C'' of a [[differential graded category]] ''C'' is defined to have the same objects as ''C'', but morphisms are defined by
			<math>Hom_{Ho C}(X, Y) = H^0 Hom_C (X, Y)</math>. (This boils down to the homotopy of chain complexes if ''C'' is the category of complexes whose morphisms do not have to respect the differentials). If ''C'' has cones and shifts in a suitable sense, then ''Ho C'' is a triangulated category, too.

			==References==
			* {{Citation \| last1=Manin \| first1=Yuri Ivanovich \| author1-link = Yuri Ivanovich Manin \| last2=Gelfand \| first2=Sergei I. \| title=Methods of Homological Algebra \| publisher=[[Springer-Verlag]] \| location=Berlin, New York \| isbn=978-3-540-43583-9 \| year=2003}}
			* {{Weibel IHA}}

			[[Category:Homological algebra]]

en>Luckas-bot: r2.7.1) (Robot: Adding uk:Квалітет

2012-02-20T17:30:40Z

r2.7.1) (Robot: Adding uk:Квалітет

New page

Her title is Felicidad Ahmad. Delaware has always been my living place and will never move. The favorite hobby for him and his children is to drive and now he is attempting to make cash with it. The occupation he's been occupying for many years is a messenger.<br><br>Look into my page - [http://Chatmast.com/index.php?do=/NLKAntonygbqqzfo/info/ car warranty]

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en>Yobot: WP:CHECKWIKI error fixes using AWB (9615)

en>Luckas-bot: r2.7.1) (Robot: Adding uk:Квалітет