Criticality and conformality in the random dimer model

Sergio Caracciolo, Riccardo Fabbricatore, Marco Gherardi, Raffaele Marino, Giorgio Parisi, Gabriele Sicuro

Published 2020-12-27Version 1

In critical systems, the effect of a localized perturbation affects points that are arbitrarily far away from the perturbation location. In this paper, we study the effect of localized perturbations on the solution of the random dimer problem in $2D$. By means of an accurate numerical analysis, we show that a local perturbation of the optimal covering induces an excitation whose size is extensive with finite probability. We compute the fractal dimension of the excitations and scaling exponents. In particular, excitations in random dimer problems on non-bipartite lattices have the same statistical properties of domain walls in the $2D$ spin glass. Excitations produced in bipartite lattices, instead, are compatible with a loop-erased self-avoiding random walk process. In both cases, we find evidences of conformal invariance of the excitations, that are compatible with $\mathrm{SLE}_\kappa$ with parameter $\kappa$ depending on the bipartiteness of the underlying lattice only.