Morphological transformations on a randomly filled 3D network
Patricia Jouannot,
LERMAT, URA CNRS 1317, ISMRA, 14050 Caen Cedex, France
Jean-Paul Jernot,
LERMAT, URA CNRS 1317, ISMRA, 14050 Caen Cedex, France
Abstract
The nodes of a 3D cubic face—centred network, simulated on a computer, are randomly filled with points up to a given density. The structure obtained is then modified by two morphological transformations : dilation or closing. Two parameters can be adjusted : the density of points of the initial structure and the size of the transformation. The progressive filling of the space by transformations of increasing size is then followed by the Euler—Poincaré characteristic measured in spaces R0 to R3.
Keywords : 3D image analysis, 3D morphological transformations, Euler—Poincaré characteristic, mathematical morphology
Pour citer cet article
Patricia Jouannot & Jean-Paul Jernot, «Morphological transformations on a randomly filled 3D network», Acta Stereologica [En ligne], Volume 12 (1993), Number 1 - Sep. 1993, 1-10 URL : https://popups.uliege.be/0351-580x/index.php?id=1339.