Related papers: Variational Optimization for Quantum Problems using Deep Generative Networks

Variational Optimization for Quantum Problems using Deep Generative Networks

URL: http://arxiv.org/abs/2404.18041v1
Date: Sun, 28 Apr 2024 00:58:28 GMT
Title: Variational Optimization for Quantum Problems using Deep Generative Networks
Authors: Lingxia Zhang, Xiaodie Lin, Peidong Wang, Kaiyan Yang, Xiao Zeng, Zhaohui Wei, Zizhu Wang,
Abstract summary: We propose a general approach to design variational optimization algorithms based on generative models. We apply VGON to three quantum tasks: finding the best state in an entanglement-detection protocol, finding the ground state of a 1D quantum spin model with variational quantum circuits, and generating degenerate ground states of many-body quantum Hamiltonians.
Score: 9.011023101133953
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Optimization is one of the keystones of modern science and engineering. Its applications in quantum technology and machine learning helped nurture variational quantum algorithms and generative AI respectively. We propose a general approach to design variational optimization algorithms based on generative models: the Variational Generative Optimization Network (VGON). To demonstrate its broad applicability, we apply VGON to three quantum tasks: finding the best state in an entanglement-detection protocol, finding the ground state of a 1D quantum spin model with variational quantum circuits, and generating degenerate ground states of many-body quantum Hamiltonians. For the first task, VGON greatly reduces the optimization time compared to stochastic gradient descent while generating nearly optimal quantum states. For the second task, VGON alleviates the barren plateau problem in variational quantum circuits. For the final task, VGON can identify the degenerate ground state spaces after a single stage of training and generate a variety of states therein.

Related papers

Eigenstate Preparation on Quantum Computers [0.0]
This thesis investigates algorithms for eigenstate preparation using near-term quantum computing devices. We establish three methods in detail: quantum adiabatic evolution with optimal control, the Rodeo Algorithm, and the Variational Rodeo Algorithm. We show results suggesting that this method can be effective in preparing eigenstates, but its practicality is predicated on the preparation of an initial state that has significant overlap with the desired eigenstate.
arXiv Detail & Related papers (2024-12-19T17:28:21Z)
Optimizing random local Hamiltonians by dissipation [44.99833362998488]
We prove that a simplified quantum Gibbs sampling algorithm achieves a $Omega(frac1k)$-fraction approximation of the optimum. Our results suggest that finding low-energy states for sparsified (quasi)local spin and fermionic models is quantumly easy but classically nontrivial.
arXiv Detail & Related papers (2024-11-04T20:21:16Z)
Application of Langevin Dynamics to Advance the Quantum Natural Gradient Optimization Algorithm [47.47843839099175]
A Quantum Natural Gradient (QNG) algorithm for optimization of variational quantum circuits has been proposed recently. Momentum-QNG is more effective to escape local minima and plateaus in the variational parameter space.
arXiv Detail & Related papers (2024-09-03T15:21:16Z)
Quantum Subroutine for Variance Estimation: Algorithmic Design and Applications [80.04533958880862]
Quantum computing sets the foundation for new ways of designing algorithms. New challenges arise concerning which field quantum speedup can be achieved. Looking for the design of quantum subroutines that are more efficient than their classical counterpart poses solid pillars to new powerful quantum algorithms.
arXiv Detail & Related papers (2024-02-26T09:32:07Z)
QNEAT: Natural Evolution of Variational Quantum Circuit Architecture [95.29334926638462]
We focus on variational quantum circuits (VQC), which emerged as the most promising candidates for the quantum counterpart of neural networks. Although showing promising results, VQCs can be hard to train because of different issues, e.g., barren plateau, periodicity of the weights, or choice of architecture. We propose a gradient-free algorithm inspired by natural evolution to optimize both the weights and the architecture of the VQC.
arXiv Detail & Related papers (2023-04-14T08:03:20Z)
Improved iterative quantum algorithm for ground-state preparation [4.921552273745794]
We propose an improved iterative quantum algorithm to prepare the ground state of a Hamiltonian system. Our approach has advantages including the higher success probability at each iteration, the measurement precision-independent sampling complexity, the lower gate complexity, and only quantum resources are required when the ancillary state is well prepared.
arXiv Detail & Related papers (2022-10-16T05:57:43Z)
Surviving The Barren Plateau in Variational Quantum Circuits with Bayesian Learning Initialization [0.0]
Variational quantum-classical hybrid algorithms are seen as a promising strategy for solving practical problems on quantum computers in the near term. Here, we introduce the fast-and-slow algorithm, which uses gradients to identify a promising region in Bayesian space. Our results move variational quantum algorithms closer to their envisioned applications in quantum chemistry, optimization, and quantum simulation problems.
arXiv Detail & Related papers (2022-03-04T17:48:57Z)
Quantum algorithms for quantum dynamics: A performance study on the spin-boson model [68.8204255655161]
Quantum algorithms for quantum dynamics simulations are traditionally based on implementing a Trotter-approximation of the time-evolution operator. variational quantum algorithms have become an indispensable alternative, enabling small-scale simulations on present-day hardware. We show that, despite providing a clear reduction of quantum gate cost, the variational method in its current implementation is unlikely to lead to a quantum advantage.
arXiv Detail & Related papers (2021-08-09T18:00:05Z)
Variational Quantum Optimization with Multi-Basis Encodings [62.72309460291971]
We introduce a new variational quantum algorithm that benefits from two innovations: multi-basis graph complexity and nonlinear activation functions. Our results in increased optimization performance, two increase in effective landscapes and a reduction in measurement progress.
arXiv Detail & Related papers (2021-06-24T20:16:02Z)
Preparation of Many-body Ground States by Time Evolution with Variational Microscopic Magnetic Fields and Incomplete Interactions [1.6554452963165365]
State preparation is of fundamental importance in quantum physics. We study the latter on quantum many-body systems by the time evolution with fixed couplings and variational magnetic fields. An optimization method is proposed to optimize the magnetic fields by "fine-graining" the discretization of time.
arXiv Detail & Related papers (2021-06-03T12:04:36Z)
Optimal training of variational quantum algorithms without barren plateaus [0.0]
Variational quantum algorithms (VQAs) promise efficient use of near-term quantum computers. We show how to optimally train a VQA for learning quantum states. We propose the application of Gaussian kernels for quantum machine learning.
arXiv Detail & Related papers (2021-04-29T17:54:59Z)

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