Defect $a$-Theorem and $a$-Maximization
Abstract
Conformal defects describe the universal behaviors of a conformal field theory (CFT) in the presence of a boundary or more general impurities. The coupled critical system is characterized by new conformal anomalies which are analogous to, and generalize those of standalone CFTs. Here we study the conformal - and -anomalies of four dimensional defects in CFTs of general spacetime dimensions greater than four. We prove that under unitary defect renormalization group (RG) flows, the defect -anomaly must decrease, thus establishing the defect -theorem. For conformal defects preserving minimal supersymmetry, the full defect symmetry contains a distinguished subgroup. We derive the anomaly multiplet relations that express the defect - and -anomalies in terms of the defect (mixed) 't Hooft anomalies for this symmetry. Once the symmetry is identified using the defect -maximization principle which we prove, this enables a non-perturbative pathway to the conformal anomalies of strongly coupled defects. We illustrate our methods by discussing a number of examples including boundaries in five dimensions and codimension-two defects in six dimensions. We also comment on chiral algebra sectors of defect operator algebras and potential conformal collider bounds on defect anomalies.
Cite
@article{arxiv.2101.12648,
title = {Defect $a$-Theorem and $a$-Maximization},
author = {Yifan Wang},
journal= {arXiv preprint arXiv:2101.12648},
year = {2022}
}
Comments
58 pages, 1 figure, 2 tables