Quantum Operations on Conformal Nets
Abstract
On a conformal net , one can consider collections of unital completely positive maps on each local algebra , subject to natural compatibility, vacuum preserving and conformal covariance conditions. We call \emph{quantum operations} on the subset of extreme such maps. The usual automorphisms of (the vacuum preserving invertible unital *-algebra morphisms) are examples of quantum operations, and we show that the fixed point subnet of under all quantum operations is the Virasoro net generated by the stress-energy tensor of . Furthermore, we show that every irreducible conformal subnet is the fixed points under a subset of quantum operations. When is discrete (or with finite Jones index), we show that the set of quantum operations on that leave elementwise fixed has naturally the structure of a compact (or finite) hypergroup, thus extending some results of [Bis17]. Under the same assumptions, we provide a Galois correspondence between intermediate conformal nets and closed subhypergroups. In particular, we show that intermediate conformal nets are in one-to-one correspondence with intermediate subfactors, extending a result of Longo in the finite index/completely rational conformal net setting [Lon03].
Cite
@article{arxiv.2204.14105,
title = {Quantum Operations on Conformal Nets},
author = {Marcel Bischoff and Simone Del Vecchio and Luca Giorgetti},
journal= {arXiv preprint arXiv:2204.14105},
year = {2023}
}
Comments
22 pages