Vortex statistics in a disordered two-dimensional XY model

TL;DR

This paper investigates vortex behavior in a disordered 2D XY model, revealing a phase with quasi-long-range order below a critical disorder strength, using analytical methods including renormalization group analysis.

Contribution

It provides a nearly exact calculation of vortex free energy and identifies the non-universality of the critical disorder strength in the disordered 2D XY model.

Findings

Existence of a quasi-long-range ordered phase below a critical disorder level

Critical disorder strength $\sigma_c$ is non-universal and less than $\pi/8$

Vortex pairs localize as temperature decreases, indicating glassy behavior

Abstract

The equilibrium behavior of vortices in the classical two-dimensional (2D) XY model with uncorrelated random phase shifts is investigated. The model describes Josephson-Junction arrays with positional disorder, and has ramifications in a number of other bond-disordered 2D systems. The vortex Hamiltonian is that of a Coulomb gas in a background of quenched random dipoles, which is capable of forming either a dielectric insulator or a plasma. We confirm a recent suggestion by Nattermann, Scheidl, Korshunov, and Li [J. Phys. I (France) {\bf 5}, 565 (1995)], and by Cha and Fertig [Phys. Rev. Lett. {\bf 74}, 4867 (1995)] that, when the variance $\sigma$ of random phase shifts is smaller than a critical value $\sigma_c$, the system is in a phase with quasi-long-range order at low temperatures, without a reentrance transition. This conclusion is reached through a nearly exact calculation of the single-vortex free energy, and a Kosterlitz-type renormalization group analysis of screening and random polarization effects from vortex-antivortex pairs. The critical strength of disorder $\sigma_c$ is found not to be universal, but generally lies in the range $0<\sigma_c<\pi/8$. Argument is presented to suggest that the system at $\sigma>\sigma_c$ does not possess long-range glassy order at any finite temperature. In the ordered phase, vortex pairs undergo a series of spatial and angular localization processes as the temperature is lowered. This behavior, which is common to many glass-forming systems, can be quantified through approximate mappings to the random energy model and to the directed polymer on the Cayley tree. Various critical properties at the order-disorder transition are calculated.