Random Projection Depth for Multivariate Mathematical Morphology

Author

Velasco-Forero, Santiago ; Angulo, Jesús

Author_Institution

Centre for Math. Morphology, MINES Paris-Tech, Fontainebleau, France

Volume

6

Issue

7

fYear

2012

Firstpage

753

Lastpage

763

Abstract

The open problem of the generalization of mathematical morphology to vector images is handled in this paper using the paradigm of depth functions. Statistical depth functions provide from the “deepest” point a “center-outward ordering” of a multidimensional data distribution and they can be therefore used to construct morphological operators. The fundamental assumption of this data-driven approach is the existence of “background/foreground” image representation. Examples in real color and hyperspectral images illustrate the results.

Keywords

image colour analysis; image representation; mathematical morphology; center-outward ordering; depth functions paradigm; fundamental assumption; hyperspectral images; image representation; morphological operators; multidimensional data distribution; multivariate mathematical morphology; random projection depth; real color; statistical depth functions; vector images; Hyperspectral imaging; Image color analysis; Lattices; Morphology; Random variables; Robustness; Vectors; Hyperspectral images; multivariate morphology; statistical depth function;

fLanguage

English

Journal_Title

Selected Topics in Signal Processing, IEEE Journal of

Publisher

ieee

ISSN

1932-4553

Type

jour

DOI

10.1109/JSTSP.2012.2211336

Filename

6316065