Non-ergodic delocalized phase with Poisson level statistics
Weichen Tang, Ivan M. Khaymovich
Abstract
Motivated by the many-body localization (MBL) phase in generic interacting disordered quantum systems, we develop a model simulating the same eigenstate structure like in MBL, but in the random-matrix setting. Demonstrating the absence of energy level repulsion (Poisson statistics), this model carries non-ergodic eigenstates, delocalized over the extensive number of configurations in the Hilbert space. On the above example, we formulate general conditions to a single-particle and random-matrix models in order to carry such states, based on the transparent generalization of the Anderson localization of single-particle states and multiple resonances.
Topics & Concepts
Ergodic theoryEigenvalues and eigenvectorsDelocalized electronPoisson distributionHilbert spaceRandom matrixStatistical physicsGeneralizationPhase spaceMatrix (chemical analysis)PhysicsMathematicsQuantum mechanicsStatisticsMathematical analysisMaterials scienceComposite materialQuantum many-body systemsQuantum and electron transport phenomenaCold Atom Physics and Bose-Einstein Condensates