Stability of superdiffusion in nearly integrable spin chains
Abstract
Superdiffusive finite-temperature transport has been recently observed in a variety of integrable systems with nonabelian global symmetries. Superdiffusion is caused by giant Goldstone-like quasiparticles stabilized by integrability. Here, we argue that these giant quasiparticles remain long-lived, and give divergent contributions to the low-frequency conductivity , even in systems that are not perfectly integrable. We find, perturbatively, that for translation-invariant static perturbations that conserve energy, and for noisy perturbations. The (presumable) crossover to regular diffusion appears to lie beyond low-order perturbation theory. By contrast, integrability-breaking perturbations that break the nonabelian symmetry yield conventional diffusion. Numerical evidence supports the distinction between these two classes of perturbations.
Cite
@article{arxiv.2102.02219,
title = {Stability of superdiffusion in nearly integrable spin chains},
author = {Jacopo De Nardis and Sarang Gopalakrishnan and Romain Vasseur and Brayden Ware},
journal= {arXiv preprint arXiv:2102.02219},
year = {2021}
}
Comments
4 + epsilon pages, 2 figures + 8 pages supp. mat. v3: published version