A General Framework for Updating Belief Distributions

Quantum state tomography, an important task in quantum information processing, aims at reconstructing a state from prepared measurement data. Bayesian methods are recognized to be one of the good and reliable choices in estimating quantum states [9]. Several numerical works showed that Bayesian estimations are comparable to, and even better than other methods in the problem of 1-qubit state recovery. However, the problem of choosing prior distribution in the general case of n qubits is not straightforward. More importantly, the statistical performance of Bayesian type estimators have not been studied from a theoretical perspective yet. In this paper, we propose a novel prior for quantum states (density matrices), and we define pseudo-Bayesian estimators of the density matrix. Then, using PAC-Bayesian theorems [16], we derive rates of convergence for the posterior mean. The numerical performance of these estimators are tested on simulated and real datasets.

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“…Using the same proof of Lemma 4 for inequality (8) in Lemma 3, we obtain with probability at least 1 − /2, ∈ (0, 1), for any distributionπ that…”

Section: Lemmamentioning

confidence: 93%

“…Here, for computational reasons, we replace the likelihood by a pseudo-likelihood. This is an increasingly popular method in Bayesian statistics [8] and in machine learning [16,2,7]. We define the pseudo-posterior bỹ…”

Section: Peudo-bayesian Estimationmentioning

confidence: 99%

Pseudo-Bayesian quantum tomography with rank-adaptation

Mai

Alquier

2017

Journal of Statistical Planning and Inference

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“…Using an off-the-shelf method, poor mixing may follow, particularly if latent variables are sampled explicitly [16]. Alternatives include estimating the likelihood function within a MCMC step [1]; using only summary statistics implied by draws from the model [4]; using surrogate likelihood functions [6,25]. While much of the motivation for the latter is to avoid a complete specification of a model, which calls for explicit assumptions on nuisance parameters, computational considerations are also invoked.…”

Section: Contributionmentioning

confidence: 99%

“…We generate synthetic models with 10 latent variables and three variables per cluster, and 5 ordinal levels for each observed variable (a total of 30 observed variables) 6 .…”

Section: Synthetic Experimentsmentioning

confidence: 99%

Bayesian inference via projections

Silva

Kalaitzis

2015

Stat Comput

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Bayesian inference often poses difficult computational problems. Even when off-the-shelf Markov chain Monte Carlo (MCMC) methods are available to the problem at hand, mixing issues might compromise the quality of the results. We introduce a framework for situations where the model space can be naturally divided into two components: i. a baseline black-box probability distribution for the observed variables; ii. constraints enforced on functionals of this probability distribution. Inference is performed by sampling from the posterior implied by the first component, and finding projections on the space defined by the second component. We discuss the implications of this separation in terms of priors, model selection, and MCMC mixing in latent variable models. Case studies include probabilistic principal component analysis, models of marginal independence, and a interpretable class of structured ordinal probit models.

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“…In this paper, instead, the definition of conditional probability is solely based on a set of axioms. This idea was developed by reference [2] who defined a framework for general Bayesian inference and discussed its application to important statistical problems. The present paper also addresses the issue of calibrating the conditional probability with non-stochastic information.…”

Section: Introductionmentioning

confidence: 99%