Related papers: Statistics and Complexity of Wavefunction Spreading in Quantum Dynamical Systems

Statistics and Complexity of Wavefunction Spreading in Quantum Dynamical Systems

URL: http://arxiv.org/abs/2411.09390v1
Date: Thu, 14 Nov 2024 12:08:45 GMT
Title: Statistics and Complexity of Wavefunction Spreading in Quantum Dynamical Systems
Authors: Yichao Fu, Keun-Young Kim, Kunal Pal, Kuntal Pal,
Abstract summary: We consider the statistics of the results of a measurement of the spreading operator in the Krylov basis generated by the Hamiltonian of a quantum system. We show that the moments of this characteristic function are related to the so-called generalised spread complexities. We also obtain an upper bound in the change in generalised spread complexity at an arbitrary time in terms of the operator norm of the Hamiltonian.
Score: 0.0
License:
Abstract: We consider the statistics of the results of a measurement of the spreading operator in the Krylov basis generated by the Hamiltonian of a quantum system starting from a specified initial pure state. We first obtain the probability distribution of the results of measurements of this spreading operator at a certain instant of time, and compute the characteristic function of this distribution. We show that the moments of this characteristic function are related to the so-called generalised spread complexities, and obtain expressions for them in several cases when the Hamiltonian is an element of a Lie algebra. Furthermore, by considering a continuum limit of the Krylov basis, we show that the generalised spread complexities of higher orders have a peak in the time evolution for a random matrix Hamiltonian belonging to the Gaussian unitary ensemble. We also obtain an upper bound in the change in generalised spread complexity at an arbitrary time in terms of the operator norm of the Hamiltonian and discuss the significance of these results.

Related papers

Quantum Simulation of Nonlinear Dynamical Systems Using Repeated Measurement [42.896772730859645]
We present a quantum algorithm based on repeated measurement to solve initial-value problems for nonlinear ordinary differential equations. We apply this approach to the classic logistic and Lorenz systems in both integrable and chaotic regimes.
arXiv Detail & Related papers (2024-10-04T18:06:12Z)
Asymptotic Gaussian Fluctuations of Eigenvectors in Spectral Clustering [24.558241146742205]
It is shown that the signal $+$ noise structure of a general spike random matrix model is transferred to the eigenvectors of the corresponding Gram kernel matrix. This CLT-like result was the last missing piece to precisely predict the classification performance of spectral clustering.
arXiv Detail & Related papers (2024-02-19T17:25:12Z)
Complexity in two-point measurement schemes [0.0]
We show that the probability distribution associated with the change of an observable in a two-point measurement protocol with a perturbation can be written as an auto-correlation function. We probe how the evolved state spreads in the corresponding conjugate space. We show that the complexity saturates for large values of the parameter only when the pre-quench Hamiltonian is chaotic.
arXiv Detail & Related papers (2023-11-14T04:00:31Z)
Time evolution of spread complexity and statistics of work done in quantum quenches [0.0]
Lanczos coefficients corresponding to evolution under the post-quench Hamiltonian. Average work done on the system, its variance, as well as the higher order cumulants.
arXiv Detail & Related papers (2023-04-19T13:21:32Z)
On the Spectral Bias of Convolutional Neural Tangent and Gaussian Process Kernels [24.99551134153653]
We study the properties of various over-parametrized convolutional neural architectures through their respective Gaussian process and tangent neural kernels. We show that the eigenvalues decay hierarchically, quantify the rate of decay, and derive measures that reflect the composition of hierarchical features in these networks.
arXiv Detail & Related papers (2022-03-17T11:23:18Z)
Fluctuations, Bias, Variance & Ensemble of Learners: Exact Asymptotics for Convex Losses in High-Dimension [25.711297863946193]
We develop a theory for the study of fluctuations in an ensemble of generalised linear models trained on different, but correlated, features. We provide a complete description of the joint distribution of the empirical risk minimiser for generic convex loss and regularisation in the high-dimensional limit.
arXiv Detail & Related papers (2022-01-31T17:44:58Z)
Entanglement dynamics of spins using a few complex trajectories [77.34726150561087]
We consider two spins initially prepared in a product of coherent states and study their entanglement dynamics. We adopt an approach that allowed the derivation of a semiclassical formula for the linear entropy of the reduced density operator.
arXiv Detail & Related papers (2021-08-13T01:44:24Z)
Moments of quantum purity and biorthogonal polynomial recurrence [6.482224543491085]
We study the statistical behavior of entanglement over the Bures-Hall ensemble as measured by the simplest form of an entanglement entropy - the quantum purity. The main results of this work are the exact second and third moment expressions of quantum purity valid for any subsystem dimensions.
arXiv Detail & Related papers (2021-07-09T19:18:34Z)
Eigenstate thermalization in dual-unitary quantum circuits: Asymptotics of spectral functions [0.0]
The eigenstate thermalization hypothesis provides to date the most successful description of thermalization in isolated quantum systems. We study the distribution of matrix elements for a class of operators in dual-unitary quantum circuits.
arXiv Detail & Related papers (2021-03-22T09:46:46Z)
Emergent statistical mechanics from properties of disordered random matrix product states [1.3075880857448061]
We introduce a picture of generic states within the trivial phase of matter with respect to their non-equilibrium and entropic properties. We prove that disordered random matrix product states equilibrate exponentially well with overwhelming probability under the time evolution of Hamiltonians. We also prove two results about the entanglement Renyi entropy.
arXiv Detail & Related papers (2021-03-03T19:05:26Z)
Out-of-time-order correlations and the fine structure of eigenstate thermalisation [58.720142291102135]
Out-of-time-orderors (OTOCs) have become established as a tool to characterise quantum information dynamics and thermalisation. We show explicitly that the OTOC is indeed a precise tool to explore the fine details of the Eigenstate Thermalisation Hypothesis (ETH) We provide an estimation of the finite-size scaling of $omega_textrmGOE$ for the general class of observables composed of sums of local operators in the infinite-temperature regime.
arXiv Detail & Related papers (2021-03-01T17:51:46Z)

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