Theoretical aspects of ill-posed problems in statistics
| ISSN: |
1572-9036
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| Keywords: |
Primary 62G05 ; secondary 65J10 ; Ill-posed problem ; operator inversion ; deconvolution ; biased sampling ; Wicksell's problem ; regression ; errors-in-variables ; mixtures ; empirical Radon transform
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| Source: |
Springer Online Journal Archives 1860-2000
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| Topics: |
Mathematics
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| Notes: |
Abstract Ill-posed problems arise in a wide variety of practical statistical situations, ranging from biased sampling and Wicksell's problem in stereology to regression, errors-in-variables and empirical Bayes models. The common mathematics behind many of these problems is operator inversion. When this inverse is not continuous a regularization of the inverse is needed to construct approximate solutions. In the statistical literature, however, ill-posed problems are rather often solved in an ad hoc manner which obccures these common features. It is our purpose to place the concept of regularization within a general and unifying framework and to illustrate its power in a number of interesting statistical examples. We will focus on regularization in Hilbert spaces, using spectral theory and reduction to multiplication operators. A partial extension to a Banach function space is briefly considered.
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| Type of Medium: |
Electronic Resource
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| URL: |