Abstract
Disordered interacting spin chains that undergo a many-body localization transition are characterized by two limiting behaviors where the dynamics are chaotic and integrable. However, the transition region between them is not fully understood yet. We propose here a possible finite-size precursor of a critical point that shows a typical finite-size scaling and distinguishes between two different dynamical phases. The kurtosis excess of the diagonal fluctuations of the full one-dimensional momentum distribution from its microcanonical average is maximum at this singular point in the paradigmatic disordered J_1J1-J_2J2 model. For system sizes accessible to exact diagonalization, both the position and the size of this maximum scale linearly with the system size. Furthermore, we show that this singular point is found at the same disorder strength at which the Thouless and the Heisenberg energies coincide. Below this point, the spectral statistics follow the universal random matrix behavior up to the Thouless energy. Above it, no traces of chaotic behavior remain, and the spectral statistics are well described by a generalized semi-Poissonian model, eventually leading to the integrable Poissonian behavior. We provide, thus, an integrated scenario for the many-body localization transition, conjecturing that the critical point in the thermodynamic limit, if it exists, should be given by this value of disorder strength.
Highlights
In the first subsection 4.1 we present the semi-Poisson spectral statistics that is followed by chains in the many-body localization (MBL) phase; in the second subsection 4.2 we complement the previous results with the study of the Thouless energy ETh and long-range correlations on the ergodic side of the transition; in subsection 4.3 we provide a general landscape of the MBL and ergodic phases in terms of their spectral properties
Reaching the Nyquist frequency indicates that the power spectrum has completely separated from the Gaussian orthogonal ensemble (GOE) curve, and the quantum correlations of random matrix theory (RMT) are destroyed at all scales
The main conclusion of our work is that the maximum of the probability of extreme events as represented by the kurtosis excess is an indicator of the hypothetical critical point of the transition
Summary
The aim of this paper is to introduce a new finite-size precursor of the critical point separating the transition between the ergodic phase and the many-body localized phase in disordered many-body quantum systems
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