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Bibliographic Details
Main Authors: Block, Adam, Polyanskiy, Yury
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2302.04658
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author Block, Adam
Polyanskiy, Yury
author_facet Block, Adam
Polyanskiy, Yury
contents Suppose we are given access to $n$ independent samples from distribution $μ$ and we wish to output one of them with the goal of making the output distributed as close as possible to a target distribution $ν$. In this work we show that the optimal total variation distance as a function of $n$ is given by $\tildeΘ(\frac{D}{f'(n)})$ over the class of all pairs $ν,μ$ with a bounded $f$-divergence $D_f(ν\|μ)\leq D$. Previously, this question was studied only for the case when the Radon-Nikodym derivative of $ν$ with respect to $μ$ is uniformly bounded. We then consider an application in the seemingly very different field of smoothed online learning, where we show that recent results on the minimax regret and the regret of oracle-efficient algorithms still hold even under relaxed constraints on the adversary (to have bounded $f$-divergence, as opposed to bounded Radon-Nikodym derivative). Finally, we also study efficacy of importance sampling for mean estimates uniform over a function class and compare importance sampling with rejection sampling.
format Preprint
id arxiv_https___arxiv_org_abs_2302_04658
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle The Sample Complexity of Approximate Rejection Sampling with Applications to Smoothed Online Learning
Block, Adam
Polyanskiy, Yury
Machine Learning
Suppose we are given access to $n$ independent samples from distribution $μ$ and we wish to output one of them with the goal of making the output distributed as close as possible to a target distribution $ν$. In this work we show that the optimal total variation distance as a function of $n$ is given by $\tildeΘ(\frac{D}{f'(n)})$ over the class of all pairs $ν,μ$ with a bounded $f$-divergence $D_f(ν\|μ)\leq D$. Previously, this question was studied only for the case when the Radon-Nikodym derivative of $ν$ with respect to $μ$ is uniformly bounded. We then consider an application in the seemingly very different field of smoothed online learning, where we show that recent results on the minimax regret and the regret of oracle-efficient algorithms still hold even under relaxed constraints on the adversary (to have bounded $f$-divergence, as opposed to bounded Radon-Nikodym derivative). Finally, we also study efficacy of importance sampling for mean estimates uniform over a function class and compare importance sampling with rejection sampling.
title The Sample Complexity of Approximate Rejection Sampling with Applications to Smoothed Online Learning
topic Machine Learning
url https://arxiv.org/abs/2302.04658