Related papers: Structure-preserving quantum algorithms for linear and nonlinear Hamiltonian systems

Structure-preserving quantum algorithms for linear and nonlinear Hamiltonian systems

URL: http://arxiv.org/abs/2411.03599v1
Date: Wed, 06 Nov 2024 01:36:39 GMT
Title: Structure-preserving quantum algorithms for linear and nonlinear Hamiltonian systems
Authors: Hsuan-Cheng Wu, Xiantao Li,
Abstract summary: Hamiltonian systems of ordinary and partial differential equations are fundamental across modern science and engineering. A critical property for the robustness and stability of computational methods in such systems is the symplectic structure. We present quantum algorithms that incorporate symplectic, ensuring the preservation of this key structure.
Score: 0.0
License:
Abstract: Hamiltonian systems of ordinary and partial differential equations are fundamental across modern science and engineering, appearing in models that span virtually all physical scales. A critical property for the robustness and stability of computational methods in such systems is the symplectic structure, which preserves geometric properties like phase-space volume over time and energy conservation over an extended period. In this paper, we present quantum algorithms that incorporate symplectic integrators, ensuring the preservation of this key structure. We demonstrate how these algorithms maintain the symplectic properties for both linear and nonlinear Hamiltonian systems. Additionally, we provide a comprehensive theoretical analysis of the computational complexity, showing that our approach offers both accuracy and improved efficiency over classical algorithms. These results highlight the potential application of quantum algorithms for solving large-scale Hamiltonian systems while preserving essential physical properties.

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)
Learning Generalized Hamiltonians using fully Symplectic Mappings [0.32985979395737786]
Hamiltonian systems have the important property of being conservative, that is, energy is conserved throughout the evolution. In particular Hamiltonian Neural Networks have emerged as a mechanism to incorporate structural inductive bias into the NN model. We show that symplectic schemes are robust to noise and provide a good approximation of the system Hamiltonian when the state variables are sampled from a noisy observation.
arXiv Detail & Related papers (2024-09-17T12:45:49Z)
Non-equilibrium Quantum Monte Carlo Algorithm for Stabilizer Rényi Entropy in Spin Systems [0.552480439325792]
Quantum magic, or nonstabilizerness, provides a crucial characterization of quantum systems. We propose a novel and efficient algorithm for computing stabilizer R'enyi entropy, one of the measures for quantum magic, in spin systems with sign-problem free Hamiltonians.
arXiv Detail & Related papers (2024-05-29T23:59:02Z)
Scalable Quantum Computation of Highly Excited Eigenstates with Spectral Transforms [0.76146285961466]
We use the HHL algorithm to prepare excited interior eigenstates of physical Hamiltonians in a variational and targeted manner. This is enabled by the efficient computation of the expectation values of inverse Hamiltonians on quantum computers. We detail implementations of this scheme for both fault-tolerant and near-term quantum computers.
arXiv Detail & Related papers (2023-02-13T19:01:02Z)
Quantum-Classical Hybrid Algorithm for the Simulation of All-Electron Correlation [58.720142291102135]
We present a novel hybrid-classical algorithm that computes a molecule's all-electron energy and properties on the classical computer. We demonstrate the ability of the quantum-classical hybrid algorithms to achieve chemically relevant results and accuracy on currently available quantum computers.
arXiv Detail & Related papers (2021-06-22T18:00:00Z)
Fractal Structure and Generalization Properties of Stochastic Optimization Algorithms [71.62575565990502]
We prove that the generalization error of an optimization algorithm can be bounded on the complexity' of the fractal structure that underlies its generalization measure. We further specialize our results to specific problems (e.g., linear/logistic regression, one hidden/layered neural networks) and algorithms.
arXiv Detail & Related papers (2021-06-09T08:05:36Z)
Fixed Depth Hamiltonian Simulation via Cartan Decomposition [59.20417091220753]
We present a constructive algorithm for generating quantum circuits with time-independent depth. We highlight our algorithm for special classes of models, including Anderson localization in one dimensional transverse field XY model. In addition to providing exact circuits for a broad set of spin and fermionic models, our algorithm provides broad analytic and numerical insight into optimal Hamiltonian simulations.
arXiv Detail & Related papers (2021-04-01T19:06:00Z)
Quantum-Inspired Algorithms from Randomized Numerical Linear Algebra [53.46106569419296]
We create classical (non-quantum) dynamic data structures supporting queries for recommender systems and least-squares regression. We argue that the previous quantum-inspired algorithms for these problems are doing leverage or ridge-leverage score sampling in disguise.
arXiv Detail & Related papers (2020-11-09T01:13:07Z)
A Dynamical Systems Approach for Convergence of the Bayesian EM Algorithm [59.99439951055238]
We show how (discrete-time) Lyapunov stability theory can serve as a powerful tool to aid, or even lead, in the analysis (and potential design) of optimization algorithms that are not necessarily gradient-based. The particular ML problem that this paper focuses on is that of parameter estimation in an incomplete-data Bayesian framework via the popular optimization algorithm known as maximum a posteriori expectation-maximization (MAP-EM) We show that fast convergence (linear or quadratic) is achieved, which could have been difficult to unveil without our adopted S&C approach.
arXiv Detail & Related papers (2020-06-23T01:34:18Z)
On dissipative symplectic integration with applications to gradient-based optimization [77.34726150561087]
We propose a geometric framework in which discretizations can be realized systematically. We show that a generalization of symplectic to nonconservative and in particular dissipative Hamiltonian systems is able to preserve rates of convergence up to a controlled error.
arXiv Detail & Related papers (2020-04-15T00:36:49Z)

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