INFORMATION-THEORETIC WAVELET NOISE REMOVAL FOR INVERSE ELASTIC WAVE SCATTERING THEORY

A discussion of noise removal in ultrasound ~elastic wave! scattering for nondestructive evaluation is given. The methods used in this paper include a useful suboptimal Wiener filter, information theory and orthonormal wavelets. The multiresolution analysis ~MRA!, due to Mallat, is the key wavelet feature used here. Whereas Fourier transforms have a translational symmetry, wavelets have a dilation or affine symmetry which consists of the semi-direct product of a translation with a change of scale of the variable. The MRA describes the scale change features of orthonormal wavelet families. First, an empirical method of noise removal from scattered elastic waves using wavelets is shown to markedly improve the l 1 and l 2 error norms. This suggests that the wavelet scale can act as dial to ‘‘tune out’’ noise. Maximization of the Kullback-Liebler information is also shown to provide a scale-dependent noise removal technique that supports ~but does not prove! the intuition that certain small energy coefficients that are retained contain large information content. The wavelet MRA thereby locates ‘‘islands of information’’ in the phase space of the signal. It is conjectured that this method holds more generally. @S1063-651X~99!14403-9#

[1]  E. Slezak,et al.  Identification of structures from galaxy counts: use of the wavelet transform , 1990 .

[2]  Michael S. Hughes,et al.  A comparison of Shannon entropy versus signal energy for acoustic detection of artificially induced defects in Plexiglas , 1992 .

[3]  A. Kirsch An Introduction to the Mathematical Theory of Inverse Problems , 1996, Applied Mathematical Sciences.

[4]  M. M. Lavrentʹev,et al.  Ill-Posed Problems of Mathematical Physics and Analysis , 1986 .

[5]  Vstovsky Interpretation of the extreme physical information principle in terms of shift information. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[6]  F. Natterer,et al.  A propagation-backpropagation method for ultrasound tomography , 1995 .

[7]  M. Victor Wickerhauser,et al.  Adapted wavelet analysis from theory to software , 1994 .

[8]  Alfred K. Louis Approximate inverse for linear and some nonlinear problems , 1995 .

[9]  W. Tobocman,et al.  Application of wavelet analysis to inverse scattering: II , 1996 .

[10]  I. Daubechies Orthonormal bases of compactly supported wavelets , 1988 .

[11]  G. Wahba Practical Approximate Solutions to Linear Operator Equations When the Data are Noisy , 1977 .

[12]  R. A. Leibler,et al.  On Information and Sufficiency , 1951 .

[13]  Charles K. Chui,et al.  An Introduction to Wavelets , 1992 .

[14]  S.P. Neal,et al.  Flaw signature estimation in ultrasonic nondestructive evaluation using the Wiener filter with limited prior information , 1993, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[15]  B. Roy Frieden,et al.  Probability, Statistical Optics, And Data Testing , 1982 .

[16]  Ingrid Daubechies,et al.  Ten Lectures on Wavelets , 1992 .

[17]  Chen Modified Möbius inverse formula and its applications in physics. , 1989, Physical review letters.

[18]  W. Tobocman,et al.  Inverse acoustic wave scattering in two dimensions from impenetrable targets , 1989 .

[19]  Ronald R. Coifman,et al.  Entropy-based algorithms for best basis selection , 1992, IEEE Trans. Inf. Theory.

[20]  C. H. Chen,et al.  On effective spectrum‐based ultrasonic deconvolution techniques for hidden flaw characterization , 1990 .

[21]  A. N. Tikhonov,et al.  Solutions of ill-posed problems , 1977 .

[22]  C. E. SHANNON,et al.  A mathematical theory of communication , 1948, MOCO.

[23]  Stéphane Mallat,et al.  A Theory for Multiresolution Signal Decomposition: The Wavelet Representation , 1989, IEEE Trans. Pattern Anal. Mach. Intell..

[24]  William Rundell,et al.  Inverse Problems in Partial Differential Equations , 1990 .

[25]  Cho,et al.  Wavelets in electronic structure calculations. , 1993, Physical review letters.

[26]  Donald O. Thompson,et al.  Utilization of prior flaw information in ultrasonic NDE: An analysis of flaw scattering amplitude as a random variable , 1992 .

[27]  A. Grossmann,et al.  DECOMPOSITION OF HARDY FUNCTIONS INTO SQUARE INTEGRABLE WAVELETS OF CONSTANT SHAPE , 1984 .

[28]  Carruthers,et al.  Wavelet correlations in the p model. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[29]  James A. Krumhansl,et al.  Determination of flaw characteristics from ultrasonic scattering data , 1979 .

[30]  R. Tibshirani,et al.  An introduction to the bootstrap , 1993 .

[31]  S. Mallat Multiresolution approximations and wavelet orthonormal bases of L^2(R) , 1989 .

[32]  David L. Donoho,et al.  De-noising by soft-thresholding , 1995, IEEE Trans. Inf. Theory.

[33]  Ellmer,et al.  Deconvolution of Rutherford backscattering spectra: An inverse problem. , 1996, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[34]  George W. Kattawar,et al.  Scattering theory of waves and particles (2nd ed.) , 1983 .

[35]  K. J. Marsh,et al.  Fatigue crack measurement : techniques and applications , 1991 .