Chain duality I (Ex)
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− | Let $\Aa$ be an additive category and let $\Bb (\Aa)$ be the category of bounded chain complexes in $\Aa$. Using the double complex extend $T$ to a contravariant functor | + | (i) Let $\Aa$ be an additive category and let $\Bb (\Aa)$ be the category of bounded chain complexes in $\Aa$. Using the double complex extend $T$ to a contravariant functor |
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− | T \colon \Aa \rightarrow \Bb (\Aa) \quad \textup{to} \quad T \co \Bb(\Aa) \rightarrow \Bb (\Aa). | + | T \colon \Aa \rightarrow \Bb(\Aa) \quad \textup{to} \quad T \co \Bb(\Aa) \rightarrow \Bb (\Aa). |
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− | + | (ii) Suppose instead that $T \colon \Aa \to \Aa$ and that $C \in \Bb(\Aa)$ is concentrated between dimensions $0$ and $n$. Observe that the extension $T: \Bb(\Aa) \to \Bb(\Aa)$ has $T(C)$ concentrated between dimensions $0$ and $-n$. | |
</wikitex> | </wikitex> | ||
== References == | == References == | ||
{{#RefList:}} | {{#RefList:}} | ||
[[Category:Exercises]] | [[Category:Exercises]] | ||
− | [[Category:Exercises | + | [[Category:Exercises with solution]] |
Latest revision as of 16:32, 1 June 2012
(i) Let be an additive category and let be the category of bounded chain complexes in . Using the double complex extend to a contravariant functor
(ii) Suppose instead that and that is concentrated between dimensions and . Observe that the extension has concentrated between dimensions and .
References
$ and $n$ then $T(C)$ is concentrated between dimensions be an additive category and let be the category of bounded chain complexes in . Using the double complex extend to a contravariant functor(ii) Suppose instead that and that is concentrated between dimensions and . Observe that the extension has concentrated between dimensions and .
References
$ and $-n$. == References == {{#RefList:}} [[Category:Exercises]] [[Category:Exercises without solution]]\Aa be an additive category and let be the category of bounded chain complexes in . Using the double complex extend to a contravariant functor(ii) Suppose instead that and that is concentrated between dimensions and . Observe that the extension has concentrated between dimensions and .