Balanced tensor categories of representations of fixed-points conformal nets

Abstract

Let A be a (not necessarily rational) conformal net with a faithful action of a finite group G. Let RepG(A) be the G-crossed balanced W*-tensor category of G-twisted representations of A as introduced in arXiv:2606.03623. We show that there is an equivalence of balanced W*-tensor categories (RepG(A))G Rep(AG) between the G-equivariantization of RepG(A) and the category of representations of the fixed-points conformal net AG. This generalizes to the non-rational case the equivalence of braided tensor categories (RepG(A))G Rep(AG) for A rational appearing (in the language of localized endomorphisms) in arXiv:math/0403322, and it also includes the balances.