Localization of a mobile impurity interacting with an Anderson insulator
- URL: http://arxiv.org/abs/2111.08603v1
- Date: Tue, 16 Nov 2021 16:39:28 GMT
- Title: Localization of a mobile impurity interacting with an Anderson insulator
- Authors: Pietro Brighi, Alexios A. Michailidis, Kristina Kirova, Dmitry A.
Abanin, Maksym Serbyn
- Abstract summary: We study a mobile impurity, representing a small quantum bath, that interacts locally with an Anderson insulator with a finite density of localized particles.
Using an extension of the density matrix renormalization group algorithm to excited states (DMRG-X), we approximate the highly excited eigenstates of the system.
We find that the impurity remains localized in the eigenstates and entanglement is enhanced in a finite region around the position of the impurity.
- Score: 0.0
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: Thermalizing and localized many-body quantum systems present two distinct
dynamical phases of matter. Recently, the fate of a localized system coupled to
a thermalizing system viewed as a quantum bath received significant theoretical
and experimental attention. In this work, we study a mobile impurity,
representing a small quantum bath, that interacts locally with an Anderson
insulator with a finite density of localized particles. Using static Hartree
approximation to obtain an effective disorder strength, we formulate an
analytic criterion for the perturbative stability of the localization. Next, we
use an approximate dynamical Hartree method and the quasi-exact time-evolved
block decimation (TEBD) algorithm to study the dynamics of the system. We find
that the dynamical Hartree approach which completely ignores entanglement
between the impurity and localized particles predicts the delocalization of the
system. In contrast, the full numerical simulation of the unitary dynamics with
TEBD suggests the stability of localization on numerically accessible
timescales. Finally, using an extension of the density matrix renormalization
group algorithm to excited states (DMRG-X), we approximate the highly excited
eigenstates of the system. We find that the impurity remains localized in the
eigenstates and entanglement is enhanced in a finite region around the position
of the impurity, confirming the dynamical predictions. Dynamics and the DMRG-X
results provide compelling evidence for the stability of localization.
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