References
- Cohen , A. , Froment , J. and Istas , J. 1991 . Analyse multiresolution des signaux aleatoires . C.R. Acad. Sci. Paris , 312 : 567 – 570 . Ser. I
- Chui , C.K. An introduction to wavelets , Acad. Press, IncHarcourt Brace Jovanovich, Publishers .
- Anastassion , G.A. and Yu , X.M. 1992 . Monotone and probabilistic wavelet approximation . Stochastic Analysis and Applications , 10 : 251 – 264 .
- Daubechies , I. 1988 . “ Orthonomal bases of compactly supported wavelets ” . In Comm. Pure and Applied Math Vol. 41 , 909 – 996 .
- Wong , P.W. 1993 . Wavelet decomposition of harmonizable random processes . IEEE Tran. Information Theory , 39 ( 1 ) Jan : 7 – 18 .
- Cambanis S. Masry E. Wavelet approximation of deterministic and random signals: convergence properties and rats Technical Report No.352 Dep. of Statistics, University of North Carolina 1991
- Mallat , S.G. 1989 . Multiresolution approximation and wavelet orthonormal bases of L2(R) . Trans. Amer.Math Soc , 315 ( 1 ) Sept : 69 – 87 .
- Mallat , S.G. 1989 . A theory of multiresolution decomposition: The wavelet representation . IEEE Trans. Pattern Analysis and Machine Intell , 11 ( 1 ) July : 674 – 693 .
- Meyer , Y. 1990 . Ondelettes et Operateurs I,Ondelettes , Paris : Hermann .