Dyadic wavelet-based nonlinear conduction equation: theory and applications

Author

Sze, Chwen-Jye Arthur ; Liao, Hong-Yaun Mark ; Huang, Shih-Kun ; Lu, Chun-Shien

Author_Institution

Inst. of Inf. Sci., Acad. Sinica, Taipei, Taiwan

Volume

1

fYear

2000

fDate

2000

Firstpage

880

Abstract

We proposed a new dyadic wavelet-based conduction approach to take the place of the nonlinear diffusion equation for selective image smoothing. We also proved that the proposed iterated system always satisfies the so-called maximum-minimum principle no matter what kind of wavelet basis is used. Since the proposed approach does not require one to solve a partial differential equation (PDE), it is therefore more efficient and accurate than the conventional nonlinear diffusion/conduction-based methods. Experimental results using 1-D synthetic data and a real image demonstrated that the proposed method can efficiently remove noise and preserve real data

Keywords

channel bank filters; image processing; noise; nonlinear equations; partial differential equations; smoothing methods; wavelet transforms; 1D synthetic data; MRI image; PDE; data preservation; dyadic wavelet-based nonlinear conduction equation; iterated system; maximum-minimum principle; noise removal; partial differential equation; real images; reconstruction; selective image smoothing; two-band filter bank system; wavelet basis; wavelet-based function decomposition; Computer vision; Discrete wavelet transforms; Filtering; Filters; Frequency; Information science; Nonlinear equations; Smoothing methods; Stability criteria; Wavelet coefficients;

fLanguage

English

Publisher

ieee

Conference_Titel

Image Processing, 2000. Proceedings. 2000 International Conference on

Conference_Location

Vancouver, BC

ISSN

1522-4880

Print_ISBN

0-7803-6297-7

Type

conf

DOI

10.1109/ICIP.2000.901100

Filename

901100