Chaos in the Bose-glass phase of a one-dimensional disordered Bose fluid

TL;DR

This paper demonstrates that the one-dimensional disordered Bose fluid's Bose-glass phase exhibits chaos, showing extreme sensitivity to disorder and system parameters, with implications for understanding stability and correlations in disordered quantum systems.

Contribution

It introduces a nonperturbative analysis revealing chaos in the Bose-glass phase, including the chaos exponent and the instability of the fixed point under disorder and parameter variations.

Findings

Chaos manifests as loss of correlations at large scales.

Chaos exponent α is found to be 1.

Ground state is unstable to disorder and parameter changes.

Abstract

We show that the Bose-glass phase of a one-dimensional disordered Bose fluid exhibits a chaotic behavior, i.e., an extreme sensitivity to external parameters. Using bosonization, the replica formalism and the nonperturbative functional renormalization group, we find that the ground state is unstable to any modification of the disorder configuration ("disorder" chaos) or variation of the Luttinger parameter ("quantum" chaos, analog to the "temperature" chaos in classical disordered systems). This result is obtained by considering two copies of the system, with slightly different disorder configurations or Luttinger parameters, and showing that inter-copy statistical correlations are suppressed at length scales larger than an overlap length $\xi_{\mathrm{ov}}\sim |\epsilon|^{-1/\alpha}$ ($|\epsilon|\ll 1$ is a measure of the difference between the disorder distributions or Luttinger parameters of the two copies). The chaos exponent $\alpha$ can be obtained by computing $\xi_{\mathrm{ov}}$ or by studying the instability of the Bose-glass fixed point for the two-copy system when $\epsilon\neq 0$. The renormalized, functional, inter-copy disorder correlator departs from its fixed-point value -- characterized by cuspy singularities -- via a chaos boundary layer, in the same way as it approaches the Bose-glass fixed point when $\epsilon=0$ through a quantum boundary layer. Performing a linear analysis of perturbations about the Bose-glass fixed point, we find $\alpha=1$.