Related papers: Quantum transport in nonlinear Rudner-Levitov models

Quantum transport in nonlinear Rudner-Levitov models

URL: http://arxiv.org/abs/2112.12362v1
Date: Thu, 23 Dec 2021 05:04:59 GMT
Title: Quantum transport in nonlinear Rudner-Levitov models
Authors: Lei Du, Jin-Hui Wu, M. Artoni, and G. C. La Rocca
Abstract summary: Quantum transport in a class of nonlinear extensions of the Rudner-Levitov model is numerically studied in this paper. We show that the quantization of the mean displacement, which embodies the quantum coherence and the topological characteristics of the model, is markedly modified by nonlinearities.
Score: 0.7874708385247353
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum transport in a class of nonlinear extensions of the Rudner-Levitov model is numerically studied in this paper. We show that the quantization of the mean displacement, which embodies the quantum coherence and the topological characteristics of the model, is markedly modified by nonlinearities. Peculiar effects such as a "trivial-nontrivial" transition and unidirectional long-range quantum transport are observed. These phenomena can be understood on the basis of the dynamic behavior of the effective hopping terms, which are time and position dependent, containing contributions of both the linear and nonlinear couplings.d nonlinear couplings.

Related papers

The multi-state geometry of shift current and polarization [44.99833362998488]
We employ quantum state projectors to develop an explicitly gauge-invariant formalism. We provide a simple expression for the shift current that resolves its precise relation to the moments of electronic polarization. We reveal its decomposition into the sum of the skewness of the occupied states and intrinsic multi-state geometry.
arXiv Detail & Related papers (2024-09-24T18:00:02Z)
Josephson bifurcation readout: beyond the monochromatic approximation [49.1574468325115]
We analyze properties of bifurcation quantum detectors based on weakly nonlinear superconducting resonance circuits. This circuit can serve as an efficient detector of the quantum state of superconducting qubits.
arXiv Detail & Related papers (2024-05-25T22:22:37Z)
Quantum Algorithms for Nonlinear Dynamics: Revisiting Carleman Linearization with No Dissipative Conditions [0.7373617024876725]
We explore the embedding of nonlinear dynamical systems into linear ordinary differential equations (ODEs) via the Carleman linearization method. Our analysis extends these findings by exploring error bounds beyond the traditional dissipative condition. We prove how this resonance condition leads to a linear convergence with respect to the truncation level $N$ in Carleman linearization.
arXiv Detail & Related papers (2024-05-21T12:09:34Z)
Quantum nonlinear optics on the edge of small lattice fractional quantum Hall fluids [0.0]
We study the quantum dynamics of the edge modes of lattice fractional quantum Hall liquids in response to time-dependent external potentials. We show that the nonlinear chiral Luttinger liquid theory provides a quantitatively accurate description even for the small lattice geometries.
arXiv Detail & Related papers (2024-03-15T18:00:02Z)
Floquet-engineered nonlinearities and controllable pair-hopping processes: From optical Kerr cavities to correlated quantum matter [0.0]
This work explores the possibility of creating and controlling unconventional nonlinearities by periodic driving. By means of a parent quantum many-body description, we demonstrate that such driven systems are well captured by an effective NLSE. We analyze these intriguing properties both in the weakly-interacting (mean-field) regime, captured by the effective NLSE, and in the strongly-correlated quantum regime.
arXiv Detail & Related papers (2023-04-12T13:56:27Z)
Dynamical chaos in nonlinear Schr\"odinger models with subquadratic power nonlinearity [137.6408511310322]
We deal with a class of nonlinear Schr"odinger lattices with random potential and subquadratic power nonlinearity. We show that the spreading process is subdiffusive and has complex microscopic organization. The limit of quadratic power nonlinearity is also discussed and shown to result in a delocalization border.
arXiv Detail & Related papers (2023-01-20T16:45:36Z)
Nonlinear speed-ups in ultracold quantum gases [0.0]
We analyze whether and to what extent such nonlinear effects can be exploited to enhance the rate of quantum evolution. We find that the quantum speed limit grows with the strength of the nonlinearity, yet it does not trivially scale with the degree'' of nonlinearity.
arXiv Detail & Related papers (2022-06-27T15:14:47Z)
Effect of Emitters on Quantum State Transfer in Coupled Cavity Arrays [48.06402199083057]
We study the effects of atoms in cavities which can absorb and emit photons as they propagate down the array. Our model is equivalent to previously examined spin chains in the one-excitation sector and in the absence of emitters.
arXiv Detail & Related papers (2021-12-10T18:52:07Z)
Nonlinear Landauer formula: Nonlinear response theory of disordered and topological materials [5.33024001730262]
We extend the Landauer formula to the nonlinear-response regime. We show that while the linear conductance is directly related to the transmission probability, the nonlinear conductance is given by its derivatives with respect to energy. Our work opens a new avenue in quantum physics beyond the linear-response regime.
arXiv Detail & Related papers (2021-10-15T18:25:26Z)
Designing Kerr Interactions for Quantum Information Processing via Counterrotating Terms of Asymmetric Josephson-Junction Loops [68.8204255655161]
static cavity nonlinearities typically limit the performance of bosonic quantum error-correcting codes. Treating the nonlinearity as a perturbation, we derive effective Hamiltonians using the Schrieffer-Wolff transformation. Results show that a cubic interaction allows to increase the effective rates of both linear and nonlinear operations.
arXiv Detail & Related papers (2021-07-14T15:11:05Z)
Sparse Quantized Spectral Clustering [85.77233010209368]
We exploit tools from random matrix theory to make precise statements about how the eigenspectrum of a matrix changes under such nonlinear transformations. We show that very little change occurs in the informative eigenstructure even under drastic sparsification/quantization.
arXiv Detail & Related papers (2020-10-03T15:58:07Z)

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