Spatially Adaptive Splines for Statistical Linear Inverse Problems
This paper introduces a new nonparametric estimator based on penalized regression splines for linear operator equations when the data are noisy. A local roughness penalty that relies on local support properties of B-splines is introduced in order to deal with spatial heterogeneity of the function to be estimated. This estimator is shown to be consistent under weak conditions on the asymptotic behaviour of the singular values of the linear operator. Furthermore, in the usual nonparametric settings, it is shown to attain optimal rates of convergence. Then its good performances are confirmed by means of a simulation study.
Year of publication: |
2002
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Authors: | Cardot, Hervé |
Published in: |
Journal of Multivariate Analysis. - Elsevier, ISSN 0047-259X. - Vol. 81.2002, 1, p. 100-119
|
Publisher: |
Elsevier |
Keywords: | linear inverse problems integral equations deconvolution regularization local roughness penalties spatially adaptive estimators regression splines convergence |
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