A nonparametric quasi-Bayes empirical Bayes procedure is proposed for estimating sums of random variables, with recursive mixing distribution estimation, asymptotic guarantees, and uncertainty quantification.
Quasi-Bayes empirical Bayes: a sequential approach to the Poisson compound decision problem
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abstract
The Poisson compound decision problem is a long-standing problem is statistics, for which empirical Bayes methods are commonly used to estimate Poisson means in static or batch settings. We consider this problem in a streaming, or online, framework. Building on a quasi-Bayesian approach based on Newton's algorithm, we develop a sequential estimate that is easy to evaluate, computationally efficient, and has constant per-observation cost as the data accrue. We establish frequentist guarantees for the proposed estimate, including consistency and asymptotic optimality, with optimality understood as vanishing excess Bayes risk, or regret. Empirical performance is assessed through simulation studies and comparisons with benchmark procedures.
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stat.ME 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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Quasi-Bayes empirical Bayes estimation of sums of random variables
A nonparametric quasi-Bayes empirical Bayes procedure is proposed for estimating sums of random variables, with recursive mixing distribution estimation, asymptotic guarantees, and uncertainty quantification.