Related papers: Theory of mobility edge and non-ergodic extended phase in coupled random matrices

Theory of mobility edge and non-ergodic extended phase in coupled random matrices

URL: http://arxiv.org/abs/2311.08643v1
Date: Wed, 15 Nov 2023 01:43:37 GMT
Title: Theory of mobility edge and non-ergodic extended phase in coupled random matrices
Authors: Xiaoshui Lin, Guang-Can Guo, and Ming Gong
Abstract summary: The mobility edge, as a central concept in disordered models for localization-delocalization transitions, has rarely been discussed in the context of random matrix theory. We show that their overlapped spectra and un-overlapped spectra exhibit totally different scaling behaviors, which can be used to construct tunable mobility edges. Our model provides a general framework to realize the mobility edges and non-ergodic phases in a controllable way in RMT.
Score: 18.60614534900842
License: http://creativecommons.org/licenses/by/4.0/
Abstract: The mobility edge, as a central concept in disordered models for localization-delocalization transitions, has rarely been discussed in the context of random matrix theory (RMT). Here we report a new class of random matrix model by direct coupling between two random matrices, showing that their overlapped spectra and un-overlapped spectra exhibit totally different scaling behaviors, which can be used to construct tunable mobility edges. This model is a direct generalization of the Rosenzweig-Porter model, which hosts ergodic, localized, and non-ergodic extended (NEE) phases. A generic theory for these phase transitions is presented, which applies equally well to dense, sparse, and even corrected random matrices in different ensembles. We show that the phase diagram is fully characterized by two scaling exponents, and they are mapped out in various conditions. Our model provides a general framework to realize the mobility edges and non-ergodic phases in a controllable way in RMT, which pave avenue for many intriguing applications both from the pure mathematics of RMT and the possible implementations of ME in many-body models, chiral symmetry breaking in QCD and the stability of the large ecosystems.

Related papers

Latent Space Energy-based Neural ODEs [73.01344439786524]
This paper introduces a novel family of deep dynamical models designed to represent continuous-time sequence data. We train the model using maximum likelihood estimation with Markov chain Monte Carlo. Experiments on oscillating systems, videos and real-world state sequences (MuJoCo) illustrate that ODEs with the learnable energy-based prior outperform existing counterparts.
arXiv Detail & Related papers (2024-09-05T18:14:22Z)
Entanglement and the density matrix renormalisation group in the generalised Landau paradigm [0.0]
We leverage the interplay between gapped phases and dualities of symmetric one-dimensional quantum lattice models. For every phase in the phase diagram, the dual representation of the ground state that breaks all symmetries minimises both the entanglement entropy and the required number of variational parameters. Our work testifies to the usefulness of generalised non-invertible symmetries and their formal category theoretic description for the nuts and bolts simulation of strongly correlated systems.
arXiv Detail & Related papers (2024-08-12T17:51:00Z)
Tensor product random matrix theory [39.58317527488534]
We introduce a real-time field theory approach to the evolution of correlated quantum systems. We describe the full range of such crossover dynamics, from initial product states to a maximum entropy ergodic state.
arXiv Detail & Related papers (2024-04-16T21:40:57Z)
Multifractal dimensions for orthogonal-to-unitary crossover ensemble [1.0793830805346494]
We show that finite-size versions of multifractal dimensions converge to unity logarithmically slowly with increase in the system size $N$. We apply our results to analyze the multifractal dimensions in a quantum kicked rotor, a Sinai billiard system, and a correlated spin chain model in a random field.
arXiv Detail & Related papers (2023-10-05T13:22:43Z)
Learning Graphical Factor Models with Riemannian Optimization [70.13748170371889]
This paper proposes a flexible algorithmic framework for graph learning under low-rank structural constraints. The problem is expressed as penalized maximum likelihood estimation of an elliptical distribution. We leverage geometries of positive definite matrices and positive semi-definite matrices of fixed rank that are well suited to elliptical models.
arXiv Detail & Related papers (2022-10-21T13:19:45Z)
Super-model ecosystem: A domain-adaptation perspective [101.76769818069072]
This paper attempts to establish the theoretical foundation for the emerging super-model paradigm via domain adaptation. Super-model paradigms help reduce computational and data cost and carbon emission, which is critical to AI industry.
arXiv Detail & Related papers (2022-08-30T09:09:43Z)
Emergent fractal phase in energy stratified random models [0.0]
We study the effects of partial correlations in kinetic hopping terms of long-range random matrix models on their localization properties. We show that any deviation from the completely correlated case leads to the emergent non-ergodic delocalization in the system.
arXiv Detail & Related papers (2021-06-07T18:00:01Z)
Self-consistent theory of mobility edges in quasiperiodic chains [62.997667081978825]
We introduce a self-consistent theory of mobility edges in nearest-neighbour tight-binding chains with quasiperiodic potentials. mobility edges are generic in quasiperiodic systems which lack the energy-independent self-duality of the commonly studied Aubry-Andr'e-Harper model.
arXiv Detail & Related papers (2020-12-02T19:00:09Z)
Signatures of a critical point in the many-body localization transition [0.0]
We show a possible finite-size precursor of a critical point that shows a typical finite-size scaling. We show that this singular point is found at the same disorder strength at which the Thouless and the Heisenberg energies coincide.
arXiv Detail & Related papers (2020-10-17T10:33:13Z)
Graph Gamma Process Generalized Linear Dynamical Systems [60.467040479276704]
We introduce graph gamma process (GGP) linear dynamical systems to model real multivariate time series. For temporal pattern discovery, the latent representation under the model is used to decompose the time series into a parsimonious set of multivariate sub-sequences. We use the generated random graph, whose number of nonzero-degree nodes is finite, to define both the sparsity pattern and dimension of the latent state transition matrix.
arXiv Detail & Related papers (2020-07-25T04:16:34Z)
Tensor network models of AdS/qCFT [69.6561021616688]
We introduce the notion of a quasiperiodic conformal field theory (qCFT) We show that qCFT can be best understood as belonging to a paradigm of discrete holography.
arXiv Detail & Related papers (2020-04-08T18:00:05Z)

This list is automatically generated from the titles and abstracts of the papers in this site.