Related papers: Optimal Quantum Likelihood Estimation

Optimal Quantum Likelihood Estimation

URL: http://arxiv.org/abs/2509.00825v1
Date: Sun, 31 Aug 2025 12:51:44 GMT
Title: Optimal Quantum Likelihood Estimation
Authors: Alon Levi, Ziv Ossi, Eliahu Cohen, Amit Te'eni,
Abstract summary: A hybrid quantum-classical algorithm is a computational scheme in which quantum circuits are used to extract information.<n>We improve the performance of a hybrid algorithm through principled, information-theoretic optimization.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: A hybrid quantum-classical algorithm is a computational scheme in which quantum circuits are used to extract information that is then processed by a classical routine to guide subsequent quantum operations. These algorithms are especially valuable in the noisy intermediate-scale quantum (NISQ) era, where quantum resources are constrained and classical optimization plays a central role. Here, we improve the performance of a hybrid algorithm through principled, information-theoretic optimization. We focus on Quantum Likelihood Estimation (QLE) - a hybrid algorithm designed to identify the Hamiltonian governing a quantum system by iteratively updating a weight distribution based on measurement outcomes and Bayesian inference. While QLE already achieves convergence using quantum measurements and Bayesian inference, its efficiency can vary greatly depending on the choice of parameters at each step. We propose an optimization strategy that dynamically selects the initial state, measurement basis, and evolution time in each iteration to maximize the mutual information between the measurement outcome and the true Hamiltonian. This approach builds upon the information-theoretic framework recently developed in [A. Te'eni et al. Oracle problems as communication tasks and optimization of quantum algorithms, arXiv:2409.15549], and leverages mutual information as a guiding cost function for parameter selection. Our implementation employs a simulated annealing routine to minimize the conditional von Neumann entropy, thereby maximizing information gain in each iteration. The results demonstrate that our optimized version significantly reduces the number of iterations required for convergence, thus proposing a practical method for accelerating Hamiltonian learning in quantum systems. Finally, we propose a general scheme that extends our approach to solve a broader family of quantum learning problems.

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