Topological effects and conformal invariance in long-range correlated random surfaces

TL;DR

This paper investigates the conformal invariance and topological effects in long-range correlated random surfaces, revealing new insights into their critical behavior and underlying conformal field theory structure through numerical and theoretical analysis.

Contribution

It combines conformal field theory with numerical simulations to analyze the universality class and conformal invariance of level cluster percolation in long-range correlated surfaces.

Findings

Conformal invariance is observed along the entire critical line for H<0.

Topological effects reveal the presence of the stress-energy tensor components.

Scaling corrections indicate a loss of integrability moving away from pure percolation.

Abstract

We consider discrete random fractal surfaces with negative Hurst exponent $H<0$. A random colouring of the lattice is provided by activating the sites at which the surface height is greater than a given level $h$. The set of activated sites is usually denoted as the excursion set. The connected components of this set, the level clusters, define a one-parameter ($H$) family of percolation models with long-range correlation in the site occupation. The level clusters percolate at a finite value $h=h_c$ and for $H\leq-\frac{3}{4}$ the phase transition is expected to remain in the same universality class of the pure (i.e. uncorrelated) percolation. For $-\frac{3}{4}<H< 0$ instead, there is a line of critical points with continously varying exponents. The universality class of these points, in particular concerning the conformal invariance of the level clusters, is poorly understood. By combining the Conformal Field Theory and the numerical approach, we provide new insights on these phases. We focus on the connectivity function, defined as the probability that two sites belong to the same level cluster. In our simulations, the surfaces are defined on a lattice torus of size $M\times N$. We show that the topological effects on the connectivity function make manifest the conformal invariance for all the critical line $H<0$. In particular, exploiting the anisotropy of the rectangular torus ($M\neq N$), we directly test the presence of the two components of the traceless stress-energy tensor. Moreover, we probe the spectrum and the structure constants of the underlying Conformal Field Theory. Finally, we observed that the corrections to the scaling clearly point out a breaking of integrability moving from the pure percolation point to the long-range correlated one.