Litcius/Paper detail

Local integrals of motion and the quasiperiodic many-body localization transition

Hansveer Singh, Brayden Ware, Romain Vasseur, Sarang Gopalakrishnan

2021Physical review. B./Physical review. B35 citationsDOIOpen Access PDF

Abstract

We study the many-body localization (MBL) transition for interacting fermions subject to quasiperiodic potentials by constructing the local integrals of motion (LIOMs) in the MBL phase as time-averaged local operators. We study numerically how these time-averaged operators evolve across the MBL transition. We find that the norm of such time-averaged operators drops discontinuously to zero across the transition; as we discuss, this implies that LIOMs abruptly become unstable at some critical localization length of order unity. We analyze the LIOMs using hydrodynamic projections and isolating the part of the operator that is associated with interactions. Equipped with these data we perform a finite-size scaling analysis of the quasiperiodic MBL transition. Our results suggest that the quasiperiodic MBL transition occurs at considerably stronger quasiperiodic modulations and has a larger correlation-length critical exponent than previous studies had found.

Topics & Concepts

Quasiperiodic functionScalingPhase transitionPhysicsOperator (biology)Statistical physicsMotion (physics)Scaling lawExponentCritical exponentCollective motionMathematicsClassical mechanicsGeometryQuantum mechanicsCondensed matter physicsBiologyBiochemistryPhilosophyLinguisticsTranscription factorRepressorGeneQuantum many-body systemsModel Reduction and Neural NetworksPhysics of Superconductivity and Magnetism