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Bibliographic Details
Main Authors: König, Claudia, Munk, Axel, Werner, Frank
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2307.13301
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author König, Claudia
Munk, Axel
Werner, Frank
author_facet König, Claudia
Munk, Axel
Werner, Frank
contents We develop a multiscale scanning method to find anomalies in a $d$-dimensional random field in the presence of nuisance parameters. This covers the common situation that either the baseline-level or additional parameters such as the variance are unknown and have to be estimated from the data. We argue that state of the art approaches to determine asymptotically correct critical values for multiscale scanning statistics will in general fail when such parameters are naively replaced by plug-in estimators. Instead, we suggest to estimate the nuisance parameters on the largest scale and to use (only) smaller scales for multiscale scanning. We prove a uniform invariance principle for the resulting adjusted multiscale statistic (AMS), which is widely applicable and provides a computationally feasible way to simulate asymptotically correct critical values. We illustrate the implications of our theoretical results in a simulation study and in a real data example from super-resolution STED microscopy. This allows us to identify interesting regions inside a specimen in a pre-scan with controlled family-wise error rate.
format Preprint
id arxiv_https___arxiv_org_abs_2307_13301
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Multiscale scanning with nuisance parameters
König, Claudia
Munk, Axel
Werner, Frank
Applications
60F17, 62H10, 60G50, 62F03
We develop a multiscale scanning method to find anomalies in a $d$-dimensional random field in the presence of nuisance parameters. This covers the common situation that either the baseline-level or additional parameters such as the variance are unknown and have to be estimated from the data. We argue that state of the art approaches to determine asymptotically correct critical values for multiscale scanning statistics will in general fail when such parameters are naively replaced by plug-in estimators. Instead, we suggest to estimate the nuisance parameters on the largest scale and to use (only) smaller scales for multiscale scanning. We prove a uniform invariance principle for the resulting adjusted multiscale statistic (AMS), which is widely applicable and provides a computationally feasible way to simulate asymptotically correct critical values. We illustrate the implications of our theoretical results in a simulation study and in a real data example from super-resolution STED microscopy. This allows us to identify interesting regions inside a specimen in a pre-scan with controlled family-wise error rate.
title Multiscale scanning with nuisance parameters
topic Applications
60F17, 62H10, 60G50, 62F03
url https://arxiv.org/abs/2307.13301