Related papers: The distribution of localization measures of chaotic eigenstates in the stadium billiard

The distribution of localization measures of chaotic eigenstates in the stadium billiard

URL: http://arxiv.org/abs/2104.10679v1
Date: Sun, 18 Apr 2021 17:30:06 GMT
Title: The distribution of localization measures of chaotic eigenstates in the stadium billiard
Authors: Benjamin Batisti\'c and \v{C}rt Lozej and Marko Robnik
Abstract summary: The localization measures $A$ of localized chaotic eigenstates in the Poincar'e-Husimi representation. The dependence of the standard deviation $sigma$ on $alpha$ is analyzed, as well as on the spectral parameter $beta$.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: The localization measures $A$ (based on the information entropy) of localized chaotic eigenstates in the Poincar\'e-Husimi representation have a distribution on a compact interval $[0,A_0]$, which is well approximated by the {\em beta distribution}, based on our extensive numerical calculations. The system under study is the Bunimovich' stadium billiard, which is a classically ergodic system, also fully chaotic (positive Lyapunov exponent), but in the regime of a slightly distorted circle billiard (small shape parameter $\varepsilon$) the diffusion in the momentum space is very slow. The parameter $\alpha=t_H/t_T$, where $t_H$ and $t_T$ are the Heisenberg time and the classical transport time (diffusion time), respectively, is the important control parameter of the system, as in all quantum systems with the discrete energy spectrum. The measures $A$ and their distributions have been calculated for a large number of $\varepsilon$ and eigenenergies. The dependence of the standard deviation $\sigma$ on $\alpha$ is analyzed, as well as on the spectral parameter $\beta$ (level repulsion exponent of the relevant Brody level spacing distribution). The paper is a continuation of our recent paper (B. Batisti\'c, \v{C}. Lozej and M. Robnik, Nonlinear Phenomena in Complex Systems {\bf 21}, 225 (2018)), where the spectral statistics and validity of the Brody level spacing distribution has been studied for the same system, namely the dependence of $\beta$ and of the mean value $<A>$ on $\alpha$.

Related papers

Dimension-free Private Mean Estimation for Anisotropic Distributions [55.86374912608193]
Previous private estimators on distributions over $mathRd suffer from a curse of dimensionality. We present an algorithm whose sample complexity has improved dependence on dimension.
arXiv Detail & Related papers (2024-11-01T17:59:53Z)
Dynamically emergent correlations in bosons via quantum resetting [0.0]
We study the nonequilibrium stationary state (NESS) induced by quantum resetting of a system of $N$ noninteracting bosons in a harmonic trap. We fully characterize the steady state by analytically computing several physical observables such as the average density, extreme value statistics, order and gap statistics. This is a rare example of a strongly correlated quantum many-body NESS where various observables can be exactly computed.
arXiv Detail & Related papers (2024-07-29T18:00:35Z)
Thermalization of closed chaotic many-body quantum systems [0.0]
We investigate thermalization of a chaotic many-body quantum system by combining the Hartree-Fock approach and the Bohigas-Giannoni-Schmit conjecture. We show that in the semiclassical regime, $rm Tr (A rho(t))$ decays with time scale $hbar / Delta$ towards an equilibrium value.
arXiv Detail & Related papers (2023-10-04T11:16:35Z)
Classical and Quantum Elliptical Billiards: Mixed Phase Space and Short Correlations in Singlets and Doublets [0.0]
We present numerical results on classical and quantum properties in two bi-parametric families of Billiards. Our numerical calculations show evidence that the elliptical families can present a mixed classical phase space. We observed that as $rho_textc$ decreases, the $p(s)$'s tend to move away simultaneously from the GOE (singlets) and GUE (doublets) distributions.
arXiv Detail & Related papers (2023-01-11T20:56:55Z)
On parametric resonance in the laser action [91.3755431537592]
We consider the selfconsistent semiclassical Maxwell--Schr"odinger system for the solid state laser. We introduce the corresponding Poincar'e map $P$ and consider the differential $DP(Y0)$ at suitable stationary state $Y0$.
arXiv Detail & Related papers (2022-08-22T09:43:57Z)
Random quantum circuits transform local noise into global white noise [118.18170052022323]
We study the distribution over measurement outcomes of noisy random quantum circuits in the low-fidelity regime. For local noise that is sufficiently weak and unital, correlations (measured by the linear cross-entropy benchmark) between the output distribution $p_textnoisy$ of a generic noisy circuit instance shrink exponentially. If the noise is incoherent, the output distribution approaches the uniform distribution $p_textunif$ at precisely the same rate.
arXiv Detail & Related papers (2021-11-29T19:26:28Z)
Statistical properties of the localization measure of chaotic eigenstates and the spectral statistics in a mixed-type billiard [0.0]
We study the quantum localization in the chaotic eigenstates of a billiard with mixed-type phase space. We show that the level repulsion exponent $beta$ is empirically a rational function of $alpha$, and the mean $langle A rangle$ as a function of $alpha$ is also well approximated by a rational function.
arXiv Detail & Related papers (2021-04-23T15:33:26Z)
Mapping the charge-dyon system into the position-dependent effective mass background via Pauli equation [77.34726150561087]
This work aims to reproduce a quantum system composed of a charged spin - $1/2$ fermion interacting with a dyon with an opposite electrical charge.
arXiv Detail & Related papers (2020-11-01T14:38:34Z)
Spectral statistics in constrained many-body quantum chaotic systems [0.0]
We study the spectral statistics of spatially-extended many-body quantum systems with on-site Abelian symmetries or local constraints. In particular, we analytically argue that in a system of length $L$ that conserves the $mth$ multipole moment, $t_mathrmTh$ scales subdiffusively as $L2(m+1)$.
arXiv Detail & Related papers (2020-09-24T17:59:57Z)
Linear Time Sinkhorn Divergences using Positive Features [51.50788603386766]
Solving optimal transport with an entropic regularization requires computing a $ntimes n$ kernel matrix that is repeatedly applied to a vector. We propose to use instead ground costs of the form $c(x,y)=-logdotpvarphi(x)varphi(y)$ where $varphi$ is a map from the ground space onto the positive orthant $RRr_+$, with $rll n$.
arXiv Detail & Related papers (2020-06-12T10:21:40Z)
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)

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