<?xml version="1.0" encoding="ISO-8859-1"?>
<metadatalist>
	<metadata ReferenceType="Conference Proceedings">
		<site>sibgrapi.sid.inpe.br 802</site>
		<holdercode>{ibi 8JMKD3MGPEW34M/46T9EHH}</holdercode>
		<identifier>8JMKD3MGPBW34M/3CRH4DL</identifier>
		<repository>sid.inpe.br/sibgrapi/2012/10.19.16.42</repository>
		<lastupdate>2012:10.19.16.42.02 sid.inpe.br/banon/2001/03.30.15.38 administrator</lastupdate>
		<metadatarepository>sid.inpe.br/sibgrapi/2012/10.19.16.42.03</metadatarepository>
		<metadatalastupdate>2022:06.17.00.22.36 sid.inpe.br/banon/2001/03.30.15.38 administrator {D 1992}</metadatalastupdate>
		<isbn>978-85-7669-270-6</isbn>
		<citationkey>Frías:1992:TrRoIn</citationkey>
		<title>Translation and rotation invariant algebraic curve and surface fitting</title>
		<format>Impresso, On-line.</format>
		<year>1992</year>
		<numberoffiles>1</numberoffiles>
		<size>3766 KiB</size>
		<author>Frías, Bruno Cernuschi,</author>
		<affiliation>Facultad de Ingeniería da Universidad de Buenos Aires</affiliation>
		<editor>Câmara, Gilberto,</editor>
		<editor>Gomes, Jonas de Miranda,</editor>
		<e-mailaddress>cintiagraziele.silva@gmail.com</e-mailaddress>
		<conferencename>Simpósio Brasileiro de Computação Gráfica e Processamento de Imagens, 5 (SIBGRAPI)</conferencename>
		<conferencelocation>Águas de Lindóia, SP, Brazil</conferencelocation>
		<date>10-12 Nov. 1992</date>
		<publisher>Sociedade Brasileira de Computação</publisher>
		<publisheraddress>Porto Alegre</publisheraddress>
		<volume>1</volume>
		<pages>89-95</pages>
		<booktitle>Anais</booktitle>
		<tertiarytype>Artigo</tertiarytype>
		<transferableflag>1</transferableflag>
		<keywords>modeling, Bockstein constraint, method to fit algebraic curves, method to fit algebraic surfaces.</keywords>
		<abstract>A method to fit algebraic curves and surfaces using a data independent constraint invariant to rotations and translations is presented. This constraint corresponds to the generalization of the Bockstein constraint to algebraic curves of arbitrary order p > 1 in 2  D space, and algebraic surfaces of arbitrary order p > 1 in N-dimensional real space, with N > 3. The fitting is solved using standard eingenvector-eingenvalue results.</abstract>
		<type>Modelagem</type>
		<language>en</language>
		<targetfile>11 Translation and rotation invariant algebraic curve and surface fitting.pdf</targetfile>
		<usergroup>administrator</usergroup>
		<usergroup>cintiagraziele.silva@gmail.com</usergroup>
		<visibility>shown</visibility>
		<mirrorrepository>sid.inpe.br/sibgrapi@80/2007/08.02.16.22</mirrorrepository>
		<nexthigherunit>8JMKD3MGPEW34M/4742MCS</nexthigherunit>
		<nexthigherunit>8JMKD3MGPBW34M/3CTK95P</nexthigherunit>
		<nexthigherunit>8JMKD3MGPBW34M/3CTM5L8</nexthigherunit>
		<citingitemlist>sid.inpe.br/sibgrapi/2012/11.01.22.04 3</citingitemlist>
		<citingitemlist>sid.inpe.br/sibgrapi/2022/06.10.21.49 2</citingitemlist>
		<hostcollection>sid.inpe.br/banon/2001/03.30.15.38</hostcollection>
		<username>cintiagraziele.silva@gmail.com</username>
		<lasthostcollection>sid.inpe.br/banon/2001/03.30.15.38</lasthostcollection>
		<url>http://sibgrapi.sid.inpe.br/rep-/sid.inpe.br/sibgrapi/2012/10.19.16.42</url>
	</metadata>
</metadatalist>