Abstract
We study the effects of partial correlations in kinetic hopping terms of long-range disordered random matrix models on their localization properties. We consider a set of models interpolating between fully-localized Richardson’s model and the celebrated Rosenzweig-Porter model (with implemented translation-invariant symmetry). In order to do this, we propose the energy-stratified spectral structure of the hopping term allowing one to decrease the range of correlations gradually. We show both analytically and numerically that any deviation from the completely correlated case leads to the emergent non-ergodic delocalization in the system unlike the predictions of localization of cooperative shielding. In order to describe the models with correlated kinetic terms, we develop the generalization of the Dyson Brownian motion and cavity approaches basing on stochastic matrix process with independent rank-one matrix increments and examine its applicability to the above set of models.
Highlights
Fractality and multifractality are intriguing and rich phenomena quite widely spread in real world, including coastline profiles, turbulence or even heartbeat and financial dynamics
We focus on the β = 1 TIRP model which is characterized by the Gaussian distribution of the eigenvalues (4)
In this paper we consider the set of disordered random matrix models with translation-invariant correlations in the hopping term
Summary
Fractality and multifractality are intriguing and rich phenomena quite widely spread in real world, including coastline profiles, turbulence or even heartbeat and financial dynamics. The only random-matrix platform known so far to show robust fractal [14,15,16,17,18,19,20,21] or multifractal [22,23,24] properties is the family of the so-called Rosenzweig-Porter (RP) ensembles [25] and some Floquet-driven systems [26,27,28] showing the same effective Floquet Hamiltonian All these models are inevitably long-range and given by the complete graphs with different statistical properties of on-site (diagonal) disorder and matrix hopping terms.
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