Chain duality IV (Ex)

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Latest revision as of 12:02, 30 July 2013

Show that for $<wikitex>; Show that for $M$, $N$ in $\Zz_\ast (K)$ we have $$ (M \otimes_{\Zz_\ast (K)} N)_{r} = \sum_{\sigma \in K} \sum_{\sigma \leq \lambda,\mu} (M(\lambda) \otimes_{\Zz} N(\mu))_{r-|\sigma|} $$ </wikitex> == References == {{#RefList:}} [[Category:Exercises]] [[Category:Exercises without solution]]M$ , $N$ in $\Zz_\ast (K)$ we have

$\displaystyle (M \otimes_{\Zz_\ast (K)} N)_{r} = \sum_{\sigma \in K} \sum_{\sigma \leq \lambda,\mu} (M(\lambda) \otimes_{\Zz} N(\mu))_{r-|\sigma|}.$ $\displaystyle (M \otimes_{\Zz_\ast (K)} N)_{r} = \sum_{\sigma \in K} \sum_{\sigma \leq \lambda,\mu} (M(\lambda) \otimes_{\Zz} N(\mu))_{r-|\sigma|}.$

[edit] References

Chain duality IV (Ex)

Latest revision as of 12:02, 30 July 2013

[edit] References

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@@ Line 1: / Line 1: @@
 <wikitex>;
 Show that for $M$, $N$ in $\Zz_\ast (K)$ we have
-$$
+$$(M \otimes_{\Zz_\ast (K)} N)_{r} = \sum_{\sigma \in K} \sum_{\sigma \leq \lambda,\mu} (M(\lambda) \otimes_{\Zz} N(\mu))_{r-|\sigma|}.$$
- (M \otimes_{\Zz_\ast (K)} N)_{r} = \sum_{\sigma \in K} \sum_{\sigma \leq \lambda,\mu} (M(\lambda) \otimes_{\Zz} N(\mu))_{r-|\sigma|}
-$$
 </wikitex>
 == References ==