Stochastic expansions using continuous dictionaries: Lévy adaptive regression kernels

dc.contributor.author

Wolpert, RL

dc.contributor.author

Clyde, MA

dc.contributor.author

Tu, C

dc.date.accessioned

2014-06-05T14:47:15Z

dc.date.issued

2011-08-01

dc.description.abstract

This article describes a new class of prior distributions for nonparametric function estimation. The unknown function is modeled as a limit of weighted sums of kernels or generator functions indexed by continuous parameters that control local and global features such as their translation, dilation, modulation and shape. Lévy random fields and their stochastic integrals are employed to induce prior distributions for the unknown functions or, equivalently, for the number of kernels and for the parameters governing their features. Scaling, shape, and other features of the generating functions are location-specific to allow quite different function properties in different parts of the space, as with wavelet bases and other methods employing overcomplete dictionaries. We provide conditions under which the stochastic expansions converge in specified Besov or Sobolev norms. Under a Gaussian error model, this may be viewed as a sparse regression problem, with regularization induced via the Lévy random field prior distribution. Posterior inference for the unknown functions is based on a reversible jump Markov chain Monte Carlo algorithm. We compare the Lévy Adaptive Regression Kernel (LARK) method to wavelet-based methods using some of the standard test functions, and illustrate its flexibility and adaptability in nonstationary applications. © Institute of Mathematical Statistics, 2011.

dc.identifier.issn

0090-5364

dc.identifier.uri

https://hdl.handle.net/10161/8885

dc.publisher

Institute of Mathematical Statistics

dc.relation.ispartof

Annals of Statistics

dc.relation.isversionof

10.1214/11-AOS889

dc.title

Stochastic expansions using continuous dictionaries: Lévy adaptive regression kernels

dc.type

Journal article

duke.contributor.orcid

Clyde, MA|0000-0002-3595-1872

pubs.begin-page

1916

pubs.end-page

1962

pubs.issue

4

pubs.organisational-group

Duke

pubs.organisational-group

Environmental Sciences and Policy

pubs.organisational-group

Nicholas School of the Environment

pubs.organisational-group

Statistical Science

pubs.organisational-group

Trinity College of Arts & Sciences

pubs.publication-status

Published

pubs.volume

39

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