A Brief Account of the Relations between Gray-Scale Mathematical Morphologies

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http://doi.ieeecomputersociety.org/10.1109/SIBGRAPI.2005.1

XVIII Brazilian Symposium on Computer ...

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	Peter Sussner, Marcos Eduardo Valle, "A Brief Account of the Relations between Gray-Scale Mathematical Morphologies," Computer Graphics and Image Processing, Brazilian Symposium on, pp. 79-86, XVIII Brazilian Symposium on Computer Graphics and Image Processing (SIBGRAPI'05), 2005.

	BibTex	x
	@article{ 10.1109/SIBGRAPI.2005.1, author = {Peter Sussner and Marcos Eduardo Valle}, title = {A Brief Account of the Relations between Gray-Scale Mathematical Morphologies}, journal ={Computer Graphics and Image Processing, Brazilian Symposium on}, volume = {0}, year = {2005}, issn = {1530-1834}, pages = {79-86}, doi = {http://doi.ieeecomputersociety.org/10.1109/SIBGRAPI.2005.1}, publisher = {IEEE Computer Society}, address = {Los Alamitos, CA, USA}, }

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	TY - CONF JO - Computer Graphics and Image Processing, Brazilian Symposium on TI - A Brief Account of the Relations between Gray-Scale Mathematical Morphologies SN - 1530-1834 SP79 EP86 A1 - Peter Sussner, A1 - Marcos Eduardo Valle, PY - 2005 KW - null VL - 0 JA - Computer Graphics and Image Processing, Brazilian Symposium on ER -

Peter Sussner, State University of Campinas

Marcos Eduardo Valle, State University of Campinas

Mathematical morphology was originally conceived as a set theoretic approach for the processing of binary images. Approaches that extend classical binary morphology to gray-scale images are either based on umbras, thresholds, level sets, or fuzzy sets. Complete lattices form a general framework for all of these approaches. This paper discusses and compares several approaches to gray-scale mathematical morphology including the threshold, umbra, and level set approaches as well as fuzzy approaches.

Citation:

Peter Sussner, Marcos Eduardo Valle, "A Brief Account of the Relations between Gray-Scale Mathematical Morphologies," sibgrapi, pp.79-86, XVIII Brazilian Symposium on Computer Graphics and Image Processing (SIBGRAPI'05), 2005

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