Related papers: Exact Mobility Edges in One-Dimensional Mosaic Lattices Inlaid with Slowly Varying Potentials

Exact Mobility Edges in One-Dimensional Mosaic Lattices Inlaid with Slowly Varying Potentials

URL: http://arxiv.org/abs/2012.06169v1
Date: Fri, 11 Dec 2020 07:25:44 GMT
Title: Exact Mobility Edges in One-Dimensional Mosaic Lattices Inlaid with Slowly Varying Potentials
Authors: Longyan Gong
Abstract summary: We present a family of one-dimensional mosaic models inlaid with a slowly varying potential $V_n=lambdacos(pi nnu)$. The nature of eigenstates in extended, critical, weakly localized and strongly localized is diagnosed by the local density of states, the Lyapunov exponent, and the localization tensor.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We propose a family of one-dimensional mosaic models inlaid with a slowly varying potential $V_n=\lambda\cos(\pi\alpha n^\nu)$, where $n$ is the lattice site index and $0<\nu<1$. Combinating the asymptotic heuristic argument with the theory of trace map of transfer matrix, mobility edges (MEs) and pseudo-mobility edges (PMEs) in their energy spectra are solved semi-analytically, where ME separates extended states from weakly localized ones and PME separates weakly localized states from strongly localized ones. The nature of eigenstates in extended, critical, weakly localized and strongly localized is diagnosed by the local density of states, the Lyapunov exponent, and the localization tensor. Numerical calculation results are in excellent quantitative agreement with theoretical predictions.

Related papers

Robust non-ergodicity of ground state in the $\beta$ ensemble [0.0]
We study the localization properties of the ground and anti-ground states of the $beta$ ensemble. Both analytically and numerically, we show that both the edge states demonstrate non-ergodic (fractal) properties for $betasimmathcalO(1)$. Surprisingly, the fractal dimension of the edge states remain three time smaller than that of the bulk states irrespective of the global phase of the $beta$ ensemble.
arXiv Detail & Related papers (2023-11-16T19:12:00Z)
Absence of Mobility Edge in Short-range Uncorrelated Disordered Model: Coexistence of Localized and Extended States [0.0]
We provide an example of a nearest-neighbor tight-binding disordered model which carries both localized and extended states without forming the mobility edge (ME) We map the above model to the 1D Anderson model with matrix-size- and position-dependent hopping and confirm the coexistence of localized and extended states. In addition, the mapping shows that the extended states are non-ergodic and allows to analytically estimate their fractal dimensions.
arXiv Detail & Related papers (2023-05-03T18:00:03Z)
Localization in the random XXZ quantum spin chain [55.2480439325792]
We study the many-body localization (MBL) properties of the Heisenberg XXZ spin-$frac12$ chain in a random magnetic field. We prove that the system exhibits localization in any given energy interval at the bottom of the spectrum in a nontrivial region of the parameter space.
arXiv Detail & Related papers (2022-10-26T17:25:13Z)
Optimal Scaling for Locally Balanced Proposals in Discrete Spaces [65.14092237705476]
We show that efficiency of Metropolis-Hastings (M-H) algorithms in discrete spaces can be characterized by an acceptance rate that is independent of the target distribution. Knowledge of the optimal acceptance rate allows one to automatically tune the neighborhood size of a proposal distribution in a discrete space, directly analogous to step-size control in continuous spaces.
arXiv Detail & Related papers (2022-09-16T22:09:53Z)
Reentrant Localized Bulk and Localized-Extended Edge in Quasiperiodic Non-Hermitian Systems [1.4638370614615002]
The localization is one of the active and fundamental research in topology physics. We propose a novel systematic method to analyze the localization behaviors for the bulk and the edge, respectively.
arXiv Detail & Related papers (2022-07-01T02:49:23Z)
From locality to irregularity: Introducing local quenches in massive scalar field theory [68.8204255655161]
We consider the dynamics of excited local states in massive scalar field theory in an arbitrary spacetime dimension. We identify different regimes of their evolution depending on the values of the field mass and the quench regularization parameter. We also investigate the local quenches in massive scalar field theory on a cylinder and show that they cause an erratic and chaotic-like evolution of observables.
arXiv Detail & Related papers (2022-05-24T18:00:07Z)
Localisation in quasiperiodic chains: a theory based on convergence of local propagators [68.8204255655161]
We present a theory of localisation in quasiperiodic chains with nearest-neighbour hoppings, based on the convergence of local propagators. Analysing the convergence of these continued fractions, localisation or its absence can be determined, yielding in turn the critical points and mobility edges. Results are exemplified by analysing the theory for three quasiperiodic models covering a range of behaviour.
arXiv Detail & Related papers (2021-02-18T16:19:52Z)
Many-body localization of bosons in optical lattice: Dynamics in disorder-free potentials [0.0]
The phenomenon of Many-Body Stark localization of bosons in tilted optical lattice is studied. Despite the fact that no disorder is necessary for Stark localization to occur, it is very similar to well known many body localization (MBL) in sufficiently strong disorder.
arXiv Detail & Related papers (2020-07-09T12:35:39Z)
Anisotropy-mediated reentrant localization [62.997667081978825]
We consider a 2d dipolar system, $d=2$, with the generalized dipole-dipole interaction $sim r-a$, and the power $a$ controlled experimentally in trapped-ion or Rydberg-atom systems. We show that the spatially homogeneous tilt $beta$ of the dipoles giving rise to the anisotropic dipole exchange leads to the non-trivial reentrant localization beyond the locator expansion.
arXiv Detail & Related papers (2020-01-31T19:00:01Z)
Observing localisation in a 2D quasicrystalline optical lattice [52.77024349608834]
We experimentally and numerically study the ground state of non- and weakly-interacting bosons in an eightfold symmetric optical lattice. We find extended states for weak lattices but observe a localisation transition at a lattice depth of $V_0.78(2),E_mathrmrec$ for the non-interacting system.
arXiv Detail & Related papers (2020-01-29T15:54:42Z)

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