Related papers: Quantum metrology with linear Lie algebra parameterisations

Quantum metrology with linear Lie algebra parameterisations

URL: http://arxiv.org/abs/2311.12446v2
Date: Wed, 12 Jun 2024 16:08:38 GMT
Title: Quantum metrology with linear Lie algebra parameterisations
Authors: Ruvi Lecamwasam, Tatiana Iakovleva, Jason Twamley,
Abstract summary: We provide a new Lie algebra expansion for the quantum Fisher information, which results in linear differential equations. This substantially reduces the calculations involved in many metrology problems. We provide detailed examples of these methods applied to problems in quantum optics and nonlinear optomechanics.
Score: 0.0
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Lie algebraic techniques are powerful and widely-used tools for studying dynamics and metrology in quantum optics. When the Hamiltonian generates a Lie algebra with finite dimension, the unitary evolution can be expressed as a finite product of exponentials using the Wei-Norman expansion. The system is then exactly described by a finite set of scalar differential equations, even if the Hilbert space is infinite. However, the differential equations provided by the Wei-Norman expansion are nonlinear and often have singularities that prevent both analytic and numerical evaluation. We derive a new Lie algebra expansion for the quantum Fisher information, which results in linear differential equations. Together with existing Lie algebra techniques this allows many metrology problems to be analysed entirely in the Heisenberg picture. This substantially reduces the calculations involved in many metrology problems, and provides analytical solutions for problems that cannot even be solved numerically using the Wei-Norman expansion. We provide detailed examples of these methods applied to problems in quantum optics and nonlinear optomechanics.

Related papers

High-order long-time asymptotics for small solutions to the one-dimensional nonlinear Schrödinger equation [0.0]
We investigate the global well-posedness and modified scattering for the one-dimensional Schrdinger equation with gauge-invariant nonlinearity.<n>For small localized initial data of finite energy in a low-regularity class, we establish global existence of solution together with persistence of the localization of the associated profile.
arXiv Detail & Related papers (2026-02-22T22:59:23Z)
Alleviating Post-Linearization Challenges for Solving Nonlinear Systems on a Quantum Computer [0.0]
Carleman linearization provides a high dimensional infinite linear system corresponding to a finite nonlinear system.<n>We decompose the Hamiltonian into the weighted sum of non-unitary operators, namely the Sigma basis.<n>Once the Hamiltonian is decomposed, we then use the concept of unitary completion to construct the circuit.
arXiv Detail & Related papers (2026-02-06T14:56:39Z)
Explicit Discovery of Nonlinear Symmetries from Dynamic Data [50.20526548924647]
LieNLSD is the first method capable of determining the number of infinitesimal generators with nonlinear terms and their explicit expressions.<n>LieNLSD shows qualitative advantages over existing methods and improves the long rollout accuracy of neural PDE solvers by over 20%.
arXiv Detail & Related papers (2025-10-02T09:54:08Z)
Unconditionally stable time discretization of Lindblad master equations in infinite dimension using quantum channels [0.0]
We show that projecting the evolution onto a finite-dimensional subspace using a Galerkin approximation inherently introduces stiffness. We propose and establish the convergence of a family of explicit numerical schemes for time discretization adapted to infinite dimension.
arXiv Detail & Related papers (2025-03-03T16:24:49Z)
Tensor-Programmable Quantum Circuits for Solving Differential Equations [0.0]
We present a quantum solver for partial differential equations based on a flexible matrix product operator representation.<n>The capabilities of the framework are demonstrated for linear and non-linear partial differential equations.
arXiv Detail & Related papers (2025-02-06T18:23:38Z)
Nonlinear quantum computing by amplified encodings [0.0]
This paper presents a novel framework for high-dimensional nonlinear quantum computation. It exploits tensor products of amplified vector and matrix encodings. The framework offers a new path to nonlinear quantum algorithms.
arXiv Detail & Related papers (2024-11-25T14:37:57Z)
Geometric Interpretation of a nonlinear extension of Quantum Mechanics [0.0]
We show that the non-linear terms can be viewed as giving rise to gravitational effects. We suggest that the two components of the wave function represent the system described by the Hamiltonian H in two different regions of spacetime.
arXiv Detail & Related papers (2024-05-12T14:01:31Z)
Quantum Algorithm For Solving Nonlinear Algebraic Equations [0.0]
We give a quantum algorithm for solving a system of nonlinear algebraic equations. A detailed analysis are carried out to reveal that our method polylogarithmic time in relative to the number of variables. In particular, we show that our method can be modified with little effort to deal with various types, thus implying the generality of our approach.
arXiv Detail & Related papers (2024-04-04T21:20:56Z)
Physics-Informed Quantum Machine Learning: Solving nonlinear differential equations in latent spaces without costly grid evaluations [21.24186888129542]
We propose a physics-informed quantum algorithm to solve nonlinear and multidimensional differential equations. By measuring the overlaps between states which are representations of DE terms, we construct a loss that does not require independent sequential function evaluations on grid points. When the loss is trained variationally, our approach can be related to the differentiable quantum circuit protocol.
arXiv Detail & Related papers (2023-08-03T15:38:31Z)
Correspondence between open bosonic systems and stochastic differential equations [77.34726150561087]
We show that there can also be an exact correspondence at finite $n$ when the bosonic system is generalized to include interactions with the environment. A particular system with the form of a discrete nonlinear Schr"odinger equation is analyzed in more detail.
arXiv Detail & Related papers (2023-02-03T19:17:37Z)
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)
Time complexity analysis of quantum algorithms via linear representations for nonlinear ordinary and partial differential equations [31.986350313948435]
We construct quantum algorithms to compute the solution and/or physical observables of nonlinear ordinary differential equations. We compare the quantum linear systems algorithms based methods and the quantum simulation methods arising from different numerical approximations.
arXiv Detail & Related papers (2022-09-18T05:50:23Z)
Exact solutions of interacting dissipative systems via weak symmetries [77.34726150561087]
We analytically diagonalize the Liouvillian of a class Markovian dissipative systems with arbitrary strong interactions or nonlinearity. This enables an exact description of the full dynamics and dissipative spectrum. Our method is applicable to a variety of other systems, and could provide a powerful new tool for the study of complex driven-dissipative quantum systems.
arXiv Detail & Related papers (2021-09-27T17:45:42Z)
Hessian Eigenspectra of More Realistic Nonlinear Models [73.31363313577941]
We make a emphprecise characterization of the Hessian eigenspectra for a broad family of nonlinear models. Our analysis takes a step forward to identify the origin of many striking features observed in more complex machine learning models.
arXiv Detail & Related papers (2021-03-02T06:59:52Z)
Linear embedding of nonlinear dynamical systems and prospects for efficient quantum algorithms [74.17312533172291]
We describe a method for mapping any finite nonlinear dynamical system to an infinite linear dynamical system (embedding) We then explore an approach for approximating the resulting infinite linear system with finite linear systems (truncation)
arXiv Detail & Related papers (2020-12-12T00:01:10Z)
The role of boundary conditions in quantum computations of scattering observables [58.720142291102135]
Quantum computing may offer the opportunity to simulate strongly-interacting field theories, such as quantum chromodynamics, with physical time evolution. As with present-day calculations, quantum computation strategies still require the restriction to a finite system size. We quantify the volume effects for various $1+1$D Minkowski-signature quantities and show that these can be a significant source of systematic uncertainty.
arXiv Detail & Related papers (2020-07-01T17:43:11Z)

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