English

A plane defect in the 3d O$(N)$ model

Strongly Correlated Electrons 2024-08-26 v1 Statistical Mechanics High Energy Physics - Theory

Abstract

It was recently found that the classical 3d O(N)(N) 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 S(x)S(0)1(logx)q\langle \vec{S}(x) \cdot \vec{S}(0)\rangle \sim \frac{1}{(\log x)^q}. This universality class exists for a range 2N<Nc2 \leq N < N_c {and Monte-Carlo simulations and conformal bootstrap} indicate Nc>3N_c > 3. In this work, we extend this result to the 3d O(N)(N) 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 N2N \ge 2. We additionally show, in agreement with our RG analysis, that the line of defect fixed points which is present at N=N = \infty is lifted to the ordinary, special (no defect) and extraordinary-log universality classes by 1/N1/N corrections. We study the `"central charge" aa for the O(N)O(N) model in the boundary and interface geometries and provide a non-trivial detailed check of an aa-theorem by Jensen and O'Bannon. Finally, we revisit the problem of the O(N)(N) model in the semi-infinite geometry. We find evidence that at N=NcN = N_c the extraordinary and special fixed points annihilate and only the ordinary fixed point is left for N>NcN > N_c.

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

R2 v1 2026-06-28T08:11:25.269Z