Title :
De-noising by soft-thresholding
Author :
Donoho, David L.
Author_Institution :
Dept. of Stat., Stanford Univ., CA, USA
fDate :
5/1/1995 12:00:00 AM
Abstract :
Donoho and Johnstone (1994) proposed a method for reconstructing an unknown function f on [0,1] from noisy data di=f(ti )+σzi, i=0, …, n-1,ti=i/n, where the zi are independent and identically distributed standard Gaussian random variables. The reconstruction fˆ*n is defined in the wavelet domain by translating all the empirical wavelet coefficients of d toward 0 by an amount σ·√(2log (n)/n). The authors prove two results about this type of estimator. [Smooth]: with high probability fˆ*n is at least as smooth as f, in any of a wide variety of smoothness measures. [Adapt]: the estimator comes nearly as close in mean square to f as any measurable estimator can come, uniformly over balls in each of two broad scales of smoothness classes. These two properties are unprecedented in several ways. The present proof of these results develops new facts about abstract statistical inference and its connection with an optimal recovery model
Keywords :
Gaussian distribution; adaptive estimation; interference suppression; minimax techniques; probability; random processes; signal reconstruction; smoothing methods; wavelet transforms; de-noising; empirical wavelet coefficients; estimator; noisy data; optimal recovery model; probability; reconstruction; smoothness measures; soft-thresholding; standard Gaussian random variables; statistical inference; unknown function; wavelet domain; Adaptive estimation; Damping; Information theory; Minimax techniques; Noise reduction; Oral communication; Random variables; Wavelet coefficients; Wavelet domain; Wavelet transforms;
Journal_Title :
Information Theory, IEEE Transactions on
