Related papers: Statistical inference for quantum singular models

Statistical inference for quantum singular models

URL: http://arxiv.org/abs/2411.16396v1
Date: Mon, 25 Nov 2024 14:01:55 GMT
Title: Statistical inference for quantum singular models
Authors: Hiroshi Yano, Yota Maeda, Naoki Yamamoto,
Abstract summary: We focus on two prominent tasks in quantum statistical inference: quantum state estimation and model selection. Key idea of the proof is the introduction of a quantum analog of the likelihood function using classical shadows.
Score: 0.39102514525861415
License:
Abstract: Deep learning has seen substantial achievements, with numerical and theoretical evidence suggesting that singularities of statistical models are considered a contributing factor to its performance. From this remarkable success of classical statistical models, it is naturally expected that quantum singular models will play a vital role in many quantum statistical tasks. However, while the theory of quantum statistical models in regular cases has been established, theoretical understanding of quantum singular models is still limited. To investigate the statistical properties of quantum singular models, we focus on two prominent tasks in quantum statistical inference: quantum state estimation and model selection. In particular, we base our study on classical singular learning theory and seek to extend it within the framework of Bayesian quantum state estimation. To this end, we define quantum generalization and training loss functions and give their asymptotic expansions through algebraic geometrical methods. The key idea of the proof is the introduction of a quantum analog of the likelihood function using classical shadows. Consequently, we construct an asymptotically unbiased estimator of the quantum generalization loss, the quantum widely applicable information criterion (QWAIC), as a computable model selection metric from given measurement outcomes.

Related papers

Quantum data learning for quantum simulations in high-energy physics [55.41644538483948]
We explore the applicability of quantum-data learning to practical problems in high-energy physics. We make use of ansatz based on quantum convolutional neural networks and numerically show that it is capable of recognizing quantum phases of ground states. The observation of non-trivial learning properties demonstrated in these benchmarks will motivate further exploration of the quantum-data learning architecture in high-energy physics.
arXiv Detail & Related papers (2023-06-29T18:00:01Z)
Quantum information criteria for model selection in quantum state estimation [0.5191792224645408]
We propose quantum information criteria for evaluating the quality of the estimated quantum state in terms of the quantum relative entropy. We derive two quantum information criteria depending on the type of estimator for the quantum relative entropy.
arXiv Detail & Related papers (2023-04-21T13:39:29Z)
Universality of critical dynamics with finite entanglement [68.8204255655161]
We study how low-energy dynamics of quantum systems near criticality are modified by finite entanglement. Our result establishes the precise role played by entanglement in time-dependent critical phenomena.
arXiv Detail & Related papers (2023-01-23T19:23:54Z)
Advantages of quantum mechanics in the estimation theory [0.0]
In quantum theory, the situation with operators is different due to its non-commutativity nature. We formulate, with complete generality, the quantum estimation theory for Gaussian states in terms of their first and second moments.
arXiv Detail & Related papers (2022-11-13T18:03:27Z)
Theory of Quantum Generative Learning Models with Maximum Mean Discrepancy [67.02951777522547]
We study learnability of quantum circuit Born machines (QCBMs) and quantum generative adversarial networks (QGANs) We first analyze the generalization ability of QCBMs and identify their superiorities when the quantum devices can directly access the target distribution. Next, we prove how the generalization error bound of QGANs depends on the employed Ansatz, the number of qudits, and input states.
arXiv Detail & Related papers (2022-05-10T08:05:59Z)
Generalization Metrics for Practical Quantum Advantage in Generative Models [68.8204255655161]
Generative modeling is a widely accepted natural use case for quantum computers. We construct a simple and unambiguous approach to probe practical quantum advantage for generative modeling by measuring the algorithm's generalization performance. Our simulation results show that our quantum-inspired models have up to a $68 times$ enhancement in generating unseen unique and valid samples.
arXiv Detail & Related papers (2022-01-21T16:35:35Z)
Pattern capacity of a single quantum perceptron [0.0]
Recent developments in Quantum Machine Learning have seen the introduction of several models to generalize the classical perceptron to the quantum regime. Here we use a statistical physics approach to compute the pattern capacity of a particular model of quantum perceptron realized by means of a continuous variable quantum system.
arXiv Detail & Related papers (2021-12-19T10:57:08Z)
Efficient criteria of quantumness for a large system of qubits [58.720142291102135]
We discuss the dimensionless combinations of basic parameters of large, partially quantum coherent systems. Based on analytical and numerical calculations, we suggest one such number for a system of qubits undergoing adiabatic evolution.
arXiv Detail & Related papers (2021-08-30T23:50:05Z)
Equivalence between classical epidemic model and non-dissipative and dissipative quantum tight-binding model [0.0]
equivalence between classical epidemic model and nondissipative and dissipative quantum tight-binding model is derived. Classical epidemic model can reproduce the quantum entanglement emerging in the case of electrostatically coupled qubits.
arXiv Detail & Related papers (2020-12-17T20:37:51Z)
Quantum Statistical Complexity Measure as a Signalling of Correlation Transitions [55.41644538483948]
We introduce a quantum version for the statistical complexity measure, in the context of quantum information theory, and use it as a signalling function of quantum order-disorder transitions. We apply our measure to two exactly solvable Hamiltonian models, namely: the $1D$-Quantum Ising Model and the Heisenberg XXZ spin-$1/2$ chain. We also compute this measure for one-qubit and two-qubit reduced states for the considered models, and analyse its behaviour across its quantum phase transitions for finite system sizes as well as in the thermodynamic limit by using Bethe ansatz.
arXiv Detail & Related papers (2020-02-05T00:45:21Z)
Local asymptotic equivalence of pure quantum states ensembles and quantum Gaussian white noise [2.578242050187029]
We analyse the theory of quantum statistical models consisting of ensembles of quantum systems identically prepared in a pure state. We use the LAE result in order to establish minimax rates for the estimation of pure states belonging to Hermite-Sobolev classes of wave functions.
arXiv Detail & Related papers (2017-05-09T17:48:40Z)

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