# Many-body localization in spin chains with the long-range transverse   interactions: scaling of critical disorder with the system size

**Authors:** Andrii O. Maksymov, Alexander L. Burin

arXiv: 1905.02286 · 2020-01-15

## TL;DR

This paper studies many-body localization in long-range interacting spin chains, deriving how the critical disorder strength scales with system size and interaction range, with implications for large systems and experimental setups.

## Contribution

It provides a novel scaling law for the critical disorder in long-range spin chains, extending understanding of localization thresholds beyond short-range models.

## Key findings

- Critical disorder scales with system size as N^{4/3 - α} log N for 0<α≤1.
- Critical disorder scales as N^{1-2α/3} log^{2/3} N for 1<α<3/2.
- Transition width scales proportionally to W_c/N.

## Abstract

We investigate many-body localization in the chain of interacting spins with a transverse power-law interaction, $J_{0}/r^{\alpha}$, and random on-site potentials, $\phi_i \in \left(-W/2,W/2\right)$, in the long-range limit, $\alpha< 3/2$, which has been recently examined experimentally on trapped ions. The many-body localization threshold is characterized by the critical disordering, $W_c$, which separates localized ($W > W_c$) and chaotic ($W < W_c$) phases. Using the analysis of the instability of localized states with respect to resonant interactions complemented by numerical finite size scaling, we show that the critical disordering scales with the number of spins, $N$, as $W_c \approx [1.37 J_{0}/(4/3 - \alpha)]N^{4/3 - \alpha} \ln N$ for $0 < \alpha \leq 1$, and as $W_c \approx [J_{0}/(1-2\alpha/3)]N^{1-2\alpha/3} \ln^{2/3} N$ for $1 < \alpha < 3/2$ while the transition width scales as $\sigma_{W} \propto W_{c}/N$. We use this result to predict the spin long-term evolution for a very large number of spins ($N = 50$), inaccessible for exact diagonalization, and to suggest the rescaling of hopping interaction with the system size to attain the localization transition at finite disordering in the thermodynamic limit of infinite number of spins.

## Full text

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## Figures

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## References

56 references — full list in the complete paper: https://tomesphere.com/paper/1905.02286/full.md

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Source: https://tomesphere.com/paper/1905.02286