Random Defect Lines in Conformal Minimal Models

TL;DR

This paper investigates how quenched disorder along defect lines affects 2D conformal minimal models, revealing that disorder leads to a fixed point with multifractal decay behavior and non-self-averaging properties, with detailed calculations for various models.

Contribution

It provides a detailed analysis of disorder effects on defect lines in minimal models, including new calculations of decay exponents and boundary entropy at two-loop order.

Findings

Disorder causes the defect to renormalize to a disorder-dominated fixed point in models other than Ising.

Decay exponents of two-point functions exhibit multifractal behavior with explicit formulas.

One-point functions show non-self-averaging amplitudes, and boundary entropy increases due to disorder.

Abstract

We analyze the effect of adding quenched disorder along a defect line in the 2D conformal minimal models using replicas. The disorder is realized by a random applied magnetic field in the Ising model, by fluctuations in the ferromagnetic bond coupling in the Tricritical Ising model and Tricritical Three-state Potts model (the $\phi_{12}$ operator), etc.. We find that for the Ising model, the defect renormalizes to two decoupled half-planes without disorder, but that for all other models, the defect renormalizes to a disorder-dominated fixed point. Its critical properties are studied with an expansion in $\eps \propto 1/m$ for the mth Virasoro minimal model. The decay exponents $X_N=\frac{N}{2}(1-\frac{9(3N-4)}{4(m+1)^2}+ \mathcal{O}(\frac{3}{m+1})^3)$ of the Nth moment of the two-point function of $\phi_{12}$ along the defect are obtained to 2-loop order, exhibiting multifractal behavior.This leads to a typical decay exponent $X_{\rm typ}={1/2} (1+\frac{9}{(m+1)^2}+\mathcal{O}(\frac{3}{m+1})^3)$. One-point functions are seen to have a non-self-averaging amplitude. The boundary entropy is larger than that of the pure system by order 1/m^3. As a byproduct of our calculations, we also obtain to 2-loop order the exponent $\tilde{X}_N=N(1-\frac{2}{9\pi^2}(3N-4)(q-2)^2+\mathcal{O}(q-2)^3)$ of the Nth moment of the energy operator in the q-state Potts model with bulk bond disorder.