Newest 'kt.k-theory-and-homology+kk-theory+homological-algebra' Questions

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Is there a $ H_* H^* $-theory which is naturally a common generalization both of singular homology and de Rham (or singular) cohomology?

It is known that $K_* K^* $-theory is a common generalization both of $K$-homology and $K$-theory as an additive bivariant functor on separable C*-algebras. Is it possible to construct a $ H_* H^* $-...

Angel65

asked Jul 2 at 20:26

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Maps in the Künneth theorem for K-theory of C*-algebras

The following is named the Künneth theorem for tensor products in the book by Blackadar on K-theory for operator algebras: If $A$ and $B$ are C*-algebras and $A$ is in the bootstrap class, then there ...

AlexE

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asked Aug 20, 2023 at 13:38

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Is there a $ H_* H^* $-theory which is naturally a common generalization both of singular homology and de Rham (or singular) cohomology?

Maps in the Künneth theorem for K-theory of C*-algebras

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Is there a $ H_* H^* $-theory which is naturally a common generalization both of singular homology and de Rham (or singular) cohomology?

Maps in the Künneth theorem for K-theory of C*-algebras

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