A plane defect in the 3d O$(N)$ model
Abstract
It was recently found that the classical 3d O model in the semi-infinite geometry can exhibit an "extraordinary-log" boundary universality class, where the spin-spin correlation function on the boundary falls off as . This universality class exists for a range {and Monte-Carlo simulations and conformal bootstrap} indicate . In this work, we extend this result to the 3d O model in an infinite geometry with a plane defect. We use renormalization group (RG) to show that in this case the extraordinary-log universality class is present for any finite . We additionally show, in agreement with our RG analysis, that the line of defect fixed points which is present at is lifted to the ordinary, special (no defect) and extraordinary-log universality classes by corrections. We study the `"central charge" for the model in the boundary and interface geometries and provide a non-trivial detailed check of an -theorem by Jensen and O'Bannon. Finally, we revisit the problem of the O model in the semi-infinite geometry. We find evidence that at the extraordinary and special fixed points annihilate and only the ordinary fixed point is left for .
Keywords
Cite
@article{arxiv.2301.05728,
title = {A plane defect in the 3d O$(N)$ model},
author = {Abijith Krishnan and Max A. Metlitski},
journal= {arXiv preprint arXiv:2301.05728},
year = {2024}
}
Comments
50 pages, 14 figures