Curvature operators in geometric image processing

Author

Mota, Cicero ; Gomes, Jonas

Author_Institution

VISGRAF Lab., Inst. de Matematica Pura e Aplicada, Rio de Janeiro, Brazil

fYear

1999

fDate

1999

Firstpage

223

Lastpage

230

Abstract

We study the problem of reconstructing an image from a perceptual segmentation based on a geometric classification of its points using non-linear curvature filters. We give a mathematical proof that an image can be reconstructed from the regions of non-zero Gaussian curvatures. This result provides the theoretical background for a new theory of non-linear two dimensional signal processing as proposed by Zetzche et al. (1990, 1993). We use curvature measures to detect edges and vertices (roughly two dimensional regions) and show that reconstruction is possible from these elements

Keywords

computational geometry; edge detection; image reconstruction; curvature measures; curvature operators; edge detection; geometric classification; geometric image processing; image reconstruction; mathematical proof; nonlinear 2D signal processing; nonlinear curvature filters; nonzero Gaussian curvatures; perceptual segmentation; vertex detection; Fourier transforms; Geometry; Gray-scale; Image coding; Image edge detection; Image processing; Image reconstruction; Laboratories; Pervasive computing; Wavelet transforms;

fLanguage

English

Publisher

ieee

Conference_Titel

Computer Graphics and Image Processing, 1999. Proceedings. XII Brazilian Symposium on

Conference_Location

Campinas

Print_ISBN

0-7695-0481-7

Type

conf

DOI

10.1109/SIBGRA.1999.805728

Filename

805728