Jörg Polzehl scite author profile

We propose a new method of nonparametric estimation which is based on locally constant smoothing with an adaptive choice of weights for every pair of data points. Some theoretical properties of the procedure are investigated. Then we demonstrate the performance of the method on some simulated univariate and bivariate examples and compare it with other nonparametric methods. Finally we discuss applications of this procedure to magnetic resonance and satellite imaging.

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Propagation-Separation Approach for Local Likelihood Estimation

Polzehl

Spokoiny

2005

Probab. Theory Relat. Fields

165

189

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The paper presents a unified approach to local likelihood estimation for a broad class of nonparametric models, including e.g. the regression, This includes the "propagation" property which particularly yields the root-n consistency of the resulting estimate in the homogeneous case.We also state an "oracle" result which implies rate optimality of the estimate under usual smoothness conditions and a "separation" result which explains the sensitivity of the method to structural changes.

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Analyzing fMRI experiments with structural adaptive smoothing procedures

et al. 2006

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Diffusion tensor imaging: Structural adaptive smoothing

Tabelow¹,

Polzehl²,

Spokoiny³

et al. 2008

NeuroImage

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Simultaneous bootstrap confidence bands in nonparametric regression

Neumann

Polzehl

1998

Journal of Nonparametric Statistics

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Jörg Polzehl

Adaptive Weights Smoothing with Applications to Image Restoration

Propagation-Separation Approach for Local Likelihood Estimation

Analyzing fMRI experiments with structural adaptive smoothing procedures

Diffusion tensor imaging: Structural adaptive smoothing

Simultaneous bootstrap confidence bands in nonparametric regression

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