Equivariant higher twisted K-theory of SU(n) for exponential functor twists

Abstract

We prove that each exponential functor on the category of finite-dimensional complex inner product spaces and isomorphisms gives rise to an equivariant higher (ie. non-classical) twist of K-theory over G=SU(n). This twist is represented by a Fell bundle E G, which reduces to the basic gerbe for the top exterior power functor. The groupoid G comes equipped with a G-action and an augmentation map G G, that is an equivariant equivalence. The C*-algebra C*(E) associated to E is stably isomorphic to the section algebra of a locally trivial bundle with stabilised strongly self-absorbing fibres. Using a version of the Mayer-Vietoris spectral sequence we compute the equivariant higher twisted K-groups KG*(C*(E)) for arbitrary exponential functor twists over SU(2), and also over SU(3) after rationalisation.