Analytic bootstrap for magnetic impurities
Abstract
We study the critical model and the free theory of a scalar triplet in the presence of a magnetic impurity. We use analytic bootstrap techniques to extract results in the -expansion. First, we extend by one order in perturbation theory the computation of the beta function for the defect coupling in the free theory. Then, we analyze in detail the low-lying spectrum of defect operators, focusing on their perturbative realization when the defect is constructed as a path-ordered exponential. After this, we consider two different bulk two-point functions and we compute them using the defect dispersion relation. For a free bulk theory, we are able to fix the form of the correlator at all orders in . In particular, taking , we can show that in one does not have a consistent and non-trivial defect CFT. For an interacting bulk, we compute the correlator up to second order in . Expanding these results in the bulk and defect block expansions, we are able to extract an infinite set of defect CFT data. We discuss low-spin ambiguities that affect every result computed through the dispersion relation and we use a combination of consistency conditions and explicit diagrammatic calculations to fix this ambiguity.
Cite
@article{arxiv.2312.05221,
title = {Analytic bootstrap for magnetic impurities},
author = {Lorenzo Bianchi and Davide Bonomi and Elia de Sabbata and Aleix Gimenez-Grau},
journal= {arXiv preprint arXiv:2312.05221},
year = {2024}
}
Comments
58 pages, 2 figures, 2 tables