Equivariant homology (Ex)
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(Created page with "<wikitex>; Is there an equivariant homology theory $\mathcal{h}^?_*$ such that $\mathcal{h}_n(G/H)$ is $\mathcal{k}_n(BH)$ for a given non-equivariant homology theory $\mathca...") |
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Is there an equivariant homology theory $\mathcal{h}^?_*$ such that | Is there an equivariant homology theory $\mathcal{h}^?_*$ such that | ||
| − | $\mathcal{h} | + | $\mathcal{h}^G_n(G/H)$ is $\mathcal{k}_n(BH)$ for a given non-equivariant homology theory $\mathcal{k}$? |
</wikitex> | </wikitex> | ||
| − | == References == | + | == References== |
{{#RefList:}} | {{#RefList:}} | ||
[[Category:Exercises]] | [[Category:Exercises]] | ||
| − | [[Category:Exercises | + | [[Category:Exercises with solution]] |
Latest revision as of 16:31, 31 August 2013
Is there an equivariant homology theory 
such that
is 
for a given non-equivariant homology theory 
?
