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Bibliographic Details
Main Authors: Kartzman, Joshua, Hawkins, Calvin, Hale, Matthew
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2601.22561
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author Kartzman, Joshua
Hawkins, Calvin
Hale, Matthew
author_facet Kartzman, Joshua
Hawkins, Calvin
Hale, Matthew
contents This paper considers the constrained sampling multi-stream quickest change detection problem, also known as the bandit quickest change detection problem. One stream contains a change-point that shifts its mean by an unknown amount. The goal is to quickly detect this change while controlling for false alarms, while being only able to sample one stream at each time. We propose an algorithm that combines a decaying-$ε$-greedy stream switching rule with a Generalized Likelihood Ratio detection procedure for unknown post-change means. We provide performance bounds for our algorithm and show it achieves approximate asymptotic first-order optimality with respect to a commonly used surrogate. We are the first to provide guarantees in this setting without assumptions such as a discretized post-change parameter set or a lower bound on the magnitude of change. We provide guarantees for a wide range of light-tailed distributions, including sub-Gaussian and bounded support distributions.
format Preprint
id arxiv_https___arxiv_org_abs_2601_22561
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Approximately Optimal Multi-Stream Quickest Change Detection
Kartzman, Joshua
Hawkins, Calvin
Hale, Matthew
Systems and Control
This paper considers the constrained sampling multi-stream quickest change detection problem, also known as the bandit quickest change detection problem. One stream contains a change-point that shifts its mean by an unknown amount. The goal is to quickly detect this change while controlling for false alarms, while being only able to sample one stream at each time. We propose an algorithm that combines a decaying-$ε$-greedy stream switching rule with a Generalized Likelihood Ratio detection procedure for unknown post-change means. We provide performance bounds for our algorithm and show it achieves approximate asymptotic first-order optimality with respect to a commonly used surrogate. We are the first to provide guarantees in this setting without assumptions such as a discretized post-change parameter set or a lower bound on the magnitude of change. We provide guarantees for a wide range of light-tailed distributions, including sub-Gaussian and bounded support distributions.
title Approximately Optimal Multi-Stream Quickest Change Detection
topic Systems and Control
url https://arxiv.org/abs/2601.22561