The continuous wavelet transform as a maximum entropy solution of the corresponding inverse problem

Author

Rebollo-Neira, Laura ; Fernandez-Rubio, Juan

Author_Institution

Dept. de Fisica, Univ. Nacional de La Plata, Argentina

Volume

47

Issue

7

fYear

1999

fDate

7/1/1999 12:00:00 AM

Firstpage

2046

Lastpage

2050

Abstract

The continuous wavelet transform is obtained as a maximum entropy solution of the corresponding inverse problem. It is well known that although a signal can be reconstructed from its wavelet transform, the expansion is not unique due to the redundancy of continuous wavelets. Hence, the inverse problem has no unique solution. If we want to recognize one solution as “optimal”, then an appropriate decision criterion has to be adopted. We show here that the continuous wavelet transform is an “optimal” solution in a maximum entropy sense

Keywords

inverse problems; maximum entropy methods; signal reconstruction; statistical analysis; wavelet transforms; continuous wavelet transform; decision criterion; inverse problem; maximum entropy solution; optimal solution; signal reconstruction; statistical description; Continuous wavelet transforms; Convergence; Entropy; Interpolation; Inverse problems; Programmable control; Signal processing algorithms; Uncertainty; Wavelet transforms; White noise;

fLanguage

English

Journal_Title

Signal Processing, IEEE Transactions on

Publisher

ieee

ISSN

1053-587X

Type

jour

DOI

10.1109/78.771053

Filename

771053