Francais | English | Espanõl

From Wikipedia, the free encyclopedia

For other uses, see Morphology.

Mathematical morphology (MM) is a theoretical model for digital images built upon lattice theory and topology. It is the foundation of morphological image processing, which is based on shift-invariant (translation invariant) operators based principally on Minkowski addition.

Mathematical morphology was originally developed for binary images, viewed as subsets of the integer grid Z² (or Z^d, for any dimension d), and was later successfully extended to grayscale images and multi-band images.

[edit] Basic operators

• Erosion
• Dilation
• Opening
• Closing

[edit] External links

• Center of Mathematical Morphology, Paris School of Mines
• History of Mathematical Morphology, by Jean Serra
• Morphology Digest, a newsletter on mathematical morphology, by Pierre Soillede:Mathematische Morphologie (Mathematik/Bildverarbeitung)

pt:Morfologia matemática tr:Matematiksel biçimbilim zh:数学形态学