# Slow dynamics and strong finite-size effects in many-body localization   with random and quasi-periodic potential

**Authors:** Felix Weiner, Ferdinand Evers, Soumya Bera

arXiv: 1904.06928 · 2019-10-07

## TL;DR

This study explores slow dynamics and finite-size effects in many-body localization within disordered and quasi-periodic quantum wires, proposing a two-phase scenario with distinct subphases and challenging existing Griffiths effect explanations.

## Contribution

It introduces a novel two-subphase framework for MBL, based on the divergence behavior of the density correlation width, and discusses finite-size effects and transition characteristics.

## Key findings

- Finite-size effects limit the growth of the correlation width.
- Evidence suggests a two-subphase structure within the MBL regime.
- Transition length scale diverges with an essential singularity.

## Abstract

We investigate charge relaxation in disordered and quasi-periodic quantum-wires of spin-less fermions ($t{-}V$-model) at different inhomogeneity strength $W$ in the localized and nearly-localized regime. Our observable is the time-dependent density correlation function, $\Phi(x,t)$, at infinite temperature. We find that disordered and quasi-periodic models behave qualitatively similar: Although even at longest observation times the width $\Delta x(t)$ of $\Phi(x,t)$ does not exceed significantly the non-interacting localization length, $\xi_0$, strong finite-size effects are encountered. Our findings appear difficult to reconcile with the rare-region physics (Griffiths effects) that often is invoked as an explanation for the slow dynamics observed by us and earlier computational studies. As a relatively reliable indicator for the boundary towards the many-body localized (MBL) regime even under these conditions, we consider the exponent function $\beta(t) {=} d\ln \Delta x(t) / d\ln t$. Motivated by our numerical data for $\beta$, we discuss a scenario in which the MBL-phase splits into two subphases: in MBL$_\text{A}$ $\Delta x(t)$ diverges slower than any power, while it converges towards a finite value in MBL$_\text{B}$. Within the scenario the transition between MBL$_\text{A}$ and the ergodic phase is characterized by a length scale, $\xi$, that exhibits an essential singularity $\ln \xi \sim 1/|W-W_\text{c}|$. Relations to earlier numerics and proposals of two-phase scenarios will be discussed.

## Full text

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## Figures

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## References

74 references — full list in the complete paper: https://tomesphere.com/paper/1904.06928/full.md

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Source: https://tomesphere.com/paper/1904.06928