Spectral Sequence Computation of Higher Twisted K-Groups of SU(n)

Abstract

Motivated by the Freed-Hopkins-Teleman theorem we study graded equivariant higher twists of K-theory for the groups G = SU(n) induced by exponential functors. We compute the rationalisation of these groups for all n and all non-trivial functors. Classical twists use the determinant functor and yield equivariant bundles of compact operators that are classified by Dixmier-Douady theory. Their equivariant K-theory reproduces the Verlinde ring of conformal field theory. Higher twists give equivariant bundles of stable UHF algebras, which can be classified using stable homotopy theory. Rationally, only the K-theory in degree (G) is again non-trivial. The non-vanishing group is a quotient of a localisation of the representation ring R(G) Q by a higher fusion ideal JF,Q. We give generators for this ideal and prove that these can be obtained as derivatives of a potential. For the exterior algebra functor, which is exponential, we show that the determinant bundle over LSU(n) has a non-commutative counterpart where the fibre is the unitary group of the UHF algebra.