nLab Conner-Floyd isomorphism

Contents

Idea

KU^\bullet(X) \cong MU^\bullet(X) \otimes_{\Omega^U} \mathbb{Z}

between the complex topological K-theory group of a finite CW-complex $X$ and the extension of scalars of the MU-cobordism cohomology of $X$ along the Todd genus $\Omega^U \overset{Td}{\longrightarrow} \mathbb{Z}$ (where $\Omega^U_{-\bullet} = MU^\bullet(\ast)$ is the MU-cobordism ring of stably almost complex manifolds $\Sigma$ , and $Td(\Sigma) \in \mathbb{Z}$ is their Todd class).

A slightly more abstract way of saying the same is

KU^\bullet(X) \cong MU^\bullet(X) \otimes_{MU^\bullet} KU^\bullet\,

which – thinking now of the Todd genus as coming from the canonical complex orientation $MU \longrightarrow KU$ (see at universal complex orientation of MU) – shows that the Conner-Floyd isomorphism is a special case of the Landweber exact functor theorem.

The analogous statement holds

and

However, the analogous statement for

(via the Conner-Floyd orientation) fails, or rather does hold with a small modification (Ochanine 87).

The original articles on the cases MU $\to$ KU and MSp $\to$ KO:

Pierre Conner, Edwin Floyd, Theorem 10.1 in: The Relation of Cobordism to K-Theories, Lecture Notes in Mathematics 28 Springer 1966 (doi:10.1007/BFb0071091, MR216511)

Russian transl.: Коннер П., Флойд Э. 0 соотношении теории кобордизмов и К-теории. - Дополнение к кн.: Гладкие периодические отображения. - М.: Мир, 1969 (djvu)

with an alternative proof for MU $\to$ KU in:

Pierre Conner, Larry Smith, Theorem 9.1 in: On the complex bordism of finite complexes, Publications Mathématiques de l’IHÉS, Tome 37 (1969) , pp. 117-221 (numdam:PMIHES_1969__37__117_0)

Review:

Dai Tamaki, Akira Kono, Theorem 6.35 in: Generalized Cohomology, Translations of Mathematical Monographs, American Mathematical Society, 2006 (ISBN: 978-0-8218-3514-2)