Title :
Multiscale regularization in Besov spaces
Author :
Leporini, D. ; Pesquet, J.C.
Author_Institution :
Lab. des Signaux et Syst., CNRS, Gif-sur-Yvette, France
Abstract :
There has been great research interest in thresholding methods for nonlinear wavelet regression over spaces of smooth functions. Near-minimax convergence rates were in particular established for simple hard and soft thresholding rules over Besov and Triebel bodies. We propose an alternative approach where nonstandard thresholding rules in dual spaces are obtained in possibly non-Gaussian noise situations, using a functional regularization framework. This method provides statistical prior models associated with the considered functional spaces. Connections with nonsmooth regularization using exponential power prior distributions are finally presented.
Keywords :
convergence of numerical methods; exponential distribution; functional analysis; impulse noise; minimax techniques; signal processing; statistical analysis; wavelet transforms; Besov spaces; dual spaces; exponential power prior distributions; functional regularization; functional spaces; hard thresholding; impulsive noise; multiscale regularization; near-minimax convergence rates; nonGaussian noise; nonlinear wavelet regression; nonsmooth regularization; nonstandard thresholding rules; smooth functions; soft thresholding; statistical prior models; thresholding methods; Additives; Convergence; Gaussian noise; Intersymbol interference; Kernel; Minimax techniques; Noise reduction; Uninterruptible power systems; Wavelet coefficients; Wavelet domain;
Conference_Titel :
Signals, Systems & Computers, 1998. Conference Record of the Thirty-Second Asilomar Conference on
Conference_Location :
Pacific Grove, CA, USA
Print_ISBN :
0-7803-5148-7
DOI :
10.1109/ACSSC.1998.750956
