Mathematical Morphology
Mathematical morphology is a theory built upon lattice theory and topology which considers shift-invariant (translation invariant) operators depending principally on the Minkowski addition operator.
Morphology's applications are found mostly in morphological image processing, for instance: detection of image elements, image segmentation, image filtering, granulometry and distance transforms. Morphology is no longer limited to binary images, its operators have been extended to handle grayscale images.
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Referenced By
List of mathematical topics (M-O) | Morphological Image Processing
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