Diffusive transport in a quasiperiodic Fibonacci chain: absence of many-body localization at weak interactionsVarma, Vipin Kerala (Avtor)
Žnidarič, Marko (Avtor)
condensed matter physicsWe study high-temperature magnetization transport in a many-body spin-1/2 chain with on-site quasiperiodic potential governed by the Fibonacci rule. In the absence of interactions it is known that the system is critical with the transport described by a continuously varying dynamical exponent (from ballistic to localized) as a function of the on-site potential strength. Upon introducing weak interactions, we find that an anomalous noninteracting dynamical exponent becomes diffusive for any potential strength. This is borne out by a boundary-driven Lindblad dynamics as well as unitary dynamics, with agreeing diffusion constants. This must be contrasted to a random potential where transport is subdiffusive at such small interactions. Mean-field treatment of the dynamics for small
U always slows down the noninteracting dynamics to subdiffusion, and is therefore unable to describe diffusion in an interacting quasiperiodic system. Finally, briefly exploring larger interactions we find a regime of interaction-induced subdiffusive dynamics, despite the on-site potential itself having no “rare regions.”20192019-11-29 14:22:33Neznano113037UDK: 538.9ISSN pri članku: 2469-9950DOI: 10.1103/PhysRevB.100.085105COBISS_ID: 3389284OceCobissID: 2997348sl