Representations of Conformal Nets, Universal C*-Algebras and K-Theory

Abstract

We study the representation theory of a conformal net A on the circle from a K-theoretical point of view using its universal C*-algebra C*(A). We prove that if A satisfies the split property then, for every representation π of A with finite statistical dimension, π(C*(A)) is weakly closed and hence a finite direct sum of type I∞ factors. We define the more manageable locally normal universal C*-algebra C*ln(A) as the quotient of C*(A) by its largest ideal vanishing in all locally normal representations and we investigate its structure. In particular, if A is completely rational with n sectors, then C*ln(A) is a direct sum of n type I∞ factors. Its ideal KA of compact operators has nontrivial K-theory, and we prove that the DHR endomorphisms of C*(A) with finite statistical dimension act on KA, giving rise to an action of the fusion semiring of DHR sectors on K0(KA)$. Moreover, we show that this action corresponds to the regular representation of the associated fusion algebra.