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		<doi>10.1109/SIBGRAPI.2005.1</doi>
		<citationkey>SussnerVall:2005:BrAcRe</citationkey>
		<title>A brief account of the relations between gray-scale mathematical morphologies</title>
		<format>On-line</format>
		<year>2005</year>
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		<author>Sussner, Peter,</author>
		<author>Valle, Marcos Eduardo,</author>
		<affiliation>Universidade Estadual de Campinas, Dept. of Applied Mathematics,</affiliation>
		<editor>Rodrigues, Maria Andréia Formico,</editor>
		<editor>Frery, Alejandro César,</editor>
		<e-mailaddress>sussner@ime.unicamp.br</e-mailaddress>
		<conferencename>Brazilian Symposium on Computer Graphics and Image Processing, 18 (SIBGRAPI)</conferencename>
		<conferencelocation>Natal, RN, Brazil</conferencelocation>
		<date>9-12 Oct. 2005</date>
		<publisher>IEEE Computer Society</publisher>
		<publisheraddress>Los Alamitos</publisheraddress>
		<booktitle>Proceedings</booktitle>
		<tertiarytype>Full Paper</tertiarytype>
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		<versiontype>finaldraft</versiontype>
		<keywords>Mathematical morphology, image processing, binary image, gray-scale image, fuzzy mathematical morphology.</keywords>
		<abstract>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.</abstract>
		<language>en</language>
		<targetfile>graycomp.pdf</targetfile>
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