Litcius/Paper detail

Stability of many-body localization in Floquet systems

Piotr Sierant, Maciej Lewenstein, Antonello Scardicchio, Jakub Zakrzewski

2023Physical review. B./Physical review. B51 citationsDOIOpen Access PDF

Abstract

We study many-body localization (MBL) transition in disordered Floquet systems using a polynomially filtered exact diagonalization (POLFED) algorithm. We focus on disordered kicked Ising model and quantitatively demonstrate that finite-size effects at the MBL transition are less severe than in the random field XXZ spin chains widely studied in the context of MBL. Our conclusions extend also to other disordered Floquet models, indicating smaller finite-size effects than those observed in the usually considered disordered autonomous spin chains. We observe consistent signatures of the transition to MBL phase for several indicators of ergodicity breaking in the kicked Ising model. Moreover, we show that an assumption of a power-law divergence of the correlation length at the MBL transition yields a critical exponent $\ensuremath{\nu}\ensuremath{\approx}2$, consistent with the Harris criterion for one-dimensional disordered systems.

Topics & Concepts

Floquet theoryPhysicsErgodicityIsing modelContext (archaeology)Statistical physicsExponentCondensed matter physicsSpin (aerodynamics)Phase transitionDivergence (linguistics)Critical exponentQuantum mechanicsPhilosophyThermodynamicsBiologyPaleontologyNonlinear systemLinguisticsQuantum many-body systemsOpinion Dynamics and Social InfluencePhysics of Superconductivity and Magnetism
Stability of many-body localization in Floquet systems | Litcius