Topological K-theory

In mathematics, topological $K$ -theory is a branch of algebraic topology. It was founded to study vector bundles on topological spaces, by means of ideas now recognised as (general) K-theory that were introduced by Alexander Grothendieck. The early work on topological $K$ -theory is due to Michael Atiyah and Friedrich Hirzebruch.

Let $X$ be a compact Hausdorff space and $k = R, C$ . Then $K k (X)$ is the Grothendieck group of the commutative monoid of isomorphism classes of finite-dimensional $k$ -vector bundles over $X$ under Whitney sum. Tensor product of bundles gives $K$ -theory a commutative ring structure. Without subscripts, $K (X)$ usually denotes complex $K$ -theory whereas real $K$ -theory is sometimes written as $KO (X)$ . The remaining discussion is focussed on complex $K$ -theory.

As a first example, note that the $K$ -theory of a point are the integers. This is because vector bundles over a point are trivial and thus classified by their rank and the Grothendieck group of the natural numbers are the integers.

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