Operator expansions, layer susceptibility and two-point functions in BCFT
Abstract
We show that in boundary CFTs, there exists a one-to-one correspondence between the boundary operator expansion of the two-point correlation function and a power series expansion of the layer susceptibility. This general property allows the direct identification of the boundary spectrum and expansion coefficients from the layer susceptibility and opens a new way for efficient calculations of two-point correlators in BCFTs. To show how it works we derive an explicit expression for the correlation function of the O(N) model at the extraordinary transition in 4- dimensional semi-infinite space to order . The bulk operator product expansion of the two-point function gives access to the spectrum of the bulk CFT. In our example, we obtain the averaged anomalous dimensions of scalar composite operators of the O(N) model to order . These agree with the known results both in and large-N expansions.
Cite
@article{arxiv.2006.11253,
title = {Operator expansions, layer susceptibility and two-point functions in BCFT},
author = {Parijat Dey and Tobias Hansen and Mykola Shpot},
journal= {arXiv preprint arXiv:2006.11253},
year = {2020}
}
Comments
34 pages, 1 figure, v2: minor improvements