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Universality Classes of Spin Transport in One-Dimensional Isotropic Magnets: The Onset of Logarithmic Anomalies

Jacopo De Nardis, Marko Medenjak, Christoph Karrasch, Enej Ilievski

2020Physical Review Letters62 citationsDOIOpen Access PDF

Abstract

We report a systematic study of finite-temperature spin transport in quantum and classical one-dimensional magnets with isotropic spin interactions, including both integrable and nonintegrable models. Employing a phenomenological framework based on a generalized Burgers' equation in a time-dependent stochastic environment, we identify four different universality classes of spin fluctuations. These comprise, aside from normal spin diffusion, three types of superdiffusive transport: the Kardar-Parisi-Zhang universality class and two distinct types of anomalous diffusion with multiplicative logarithmic corrections. Our predictions are supported by extensive numerical simulations on various examples of quantum and classical chains. Contrary to common belief, we demonstrate that even nonintegrable spin chains can display a diverging spin diffusion constant at finite temperatures.

Topics & Concepts

PhysicsUniversality (dynamical systems)IsotropyRenormalization groupSpin diffusionLogarithmIntegrable systemMultiplicative functionSpin (aerodynamics)Fick's laws of diffusionQuantumStatistical physicsQuantum mechanicsMathematical physicsDiffusionMathematicsMathematical analysisThermodynamicsQuantum many-body systemsPhysics of Superconductivity and MagnetismQuantum and electron transport phenomena
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