On Concentration for (Regularized) Empirical Risk Minimization
dc.contributor.author
van de Geer, Sara
dc.contributor.author
Wainwright, Martin J.
dc.date.accessioned
2024-03-20T10:02:29Z
dc.date.available
2017-11-06T12:44:33Z
dc.date.available
2017-11-08T12:19:36Z
dc.date.available
2024-03-20T10:02:29Z
dc.date.issued
2017-08
dc.identifier.issn
0976-836X
dc.identifier.issn
0976-8378
dc.identifier.other
10.1007/s13171-017-0111-9
en_US
dc.identifier.uri
http://hdl.handle.net/20.500.11850/204815
dc.identifier.doi
10.3929/ethz-b-000204815
dc.description.abstract
Rates of convergence for empirical risk minimizers have been well studied in the literature. In this paper, we aim to provide a complementary set of results, in particular by showing that after normalization, the risk of the empirical minimizer concentrates on a single point. Such results have been established by Chatterjee (The Annals of Statistics, 42(6):2340–2381 2014) for constrained estimators in the normal sequence model. We first generalize and sharpen this result to regularized least squares with convex penalties, making use of a “direct” argument based on Borell’s theorem. We then study generalizations to other loss functions, including the negative log-likelihood for exponential families combined with a strictly convex regularization penalty. The results in this general setting are based on more “indirect” arguments as well as on concentration inequalities for maxima of empirical processes.
en_US
dc.format
application/pdf
en_US
dc.language.iso
en
en_US
dc.publisher
Springer India
en_US
dc.rights.uri
http://rightsstatements.org/page/InC-NC/1.0/
dc.subject
Concentration
en_US
dc.subject
Density estimation
en_US
dc.subject
Empirical process
en_US
dc.subject
Empirical risk minimization
en_US
dc.subject
Normal sequence model
en_US
dc.subject
Penalized least squares
en_US
dc.title
On Concentration for (Regularized) Empirical Risk Minimization
en_US
dc.type
Journal Article
dc.rights.license
In Copyright - Non-Commercial Use Permitted
dc.date.published
2017-09-01
ethz.journal.title
Sankhya A
ethz.journal.volume
79
en_US
ethz.journal.issue
2
en_US
ethz.journal.abbreviated
Sankhya. Ser. A
ethz.pages.start
159
en_US
ethz.pages.end
200
en_US
ethz.version.deposit
publishedVersion
en_US
ethz.notes
It was possible to publish this article open access thanks to a Swiss National Licence with the publisher.
en_US
ethz.identifier.scopus
ethz.publication.place
New Delhi
en_US
ethz.publication.status
published
en_US
ethz.leitzahl
ETH Zürich::00002 - ETH Zürich::00012 - Lehre und Forschung::00007 - Departemente::02000 - Dep. Mathematik / Dep. of Mathematics::02537 - Seminar für Statistik (SfS) / Seminar for Statistics (SfS)::03717 - van de Geer, Sara (emeritus) / van de Geer, Sara (emeritus)
en_US
ethz.leitzahl.certified
ETH Zürich::00002 - ETH Zürich::00012 - Lehre und Forschung::00007 - Departemente::02000 - Dep. Mathematik / Dep. of Mathematics::02537 - Seminar für Statistik (SfS) / Seminar for Statistics (SfS)::03717 - van de Geer, Sara (emeritus) / van de Geer, Sara (emeritus)
en_US
ethz.date.deposited
2017-11-06T12:44:37Z
ethz.source
FORM
ethz.eth
yes
en_US
ethz.availability
Open access
en_US
ethz.rosetta.installDate
2017-11-08T12:19:38Z
ethz.rosetta.lastUpdated
2024-02-02T02:51:23Z
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true
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true
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