Bisognano-Wichmann property for rigid categorical extensions and non-local extensions of conformal nets

Abstract

Given an (irreducible) Mobius covariant net A, we prove a Bisognano-Wichmann theorem for its categorical extension Ed associated to the braided C*-tensor category Repd( A) of dualizable (more precisely "dualized") Mobius covariant A-modules. As a closely related result, we prove a (modified) Bisognano-Wichmann theorem for any (possibly) non-local extension of A obtained by a C*-Frobenius algebra Q in Repd( A). As an application, we discuss the relation between the domains of modular operators and the preclosedness of certain unbounded operators in Ed.