Dehn fillings and small surfaces덴 채움과 소곡면

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dc.contributor.advisorJin, Gyo-Taek-
dc.contributor.advisor진교택-
dc.contributor.authorLee, Sang-Yop-
dc.contributor.author이상엽-
dc.date.accessioned2011-12-14T04:39:20Z-
dc.date.available2011-12-14T04:39:20Z-
dc.date.issued2001-
dc.identifier.urihttp://library.kaist.ac.kr/search/detail/view.do?bibCtrlNo=169618&flag=dissertation-
dc.identifier.urihttp://hdl.handle.net/10203/41842-
dc.description학위논문(박사) - 한국과학기술원 : 수학전공, 2001.8, [ [ii], 43 p. ]-
dc.description.abstractLet M be a compact, connencted, orientable, hyperbolic 3-manifold with a toral boundary component. First, we find the maximal distance between $P^2 -reducing$ and toroidal Dehn fillings. Then we give a very short proof of the result obtained independently by Oh and Wu. Finally we investigate the situations that one filling creates a reducing sphere, and the other creates an essential small surfaces such as a sphere, torus or annulus.eng
dc.languageeng-
dc.publisher한국과학기술원-
dc.subject소곡면-
dc.subject본질곡면-
dc.subject쌍곡다양체-
dc.subject덴 수술-
dc.subject덴 채움-
dc.subjectsmall surface-
dc.subjecthyperbolic manifold-
dc.subjectessential surface-
dc.subjectDehn surgery-
dc.subjectDehn filling-
dc.titleDehn fillings and small surfaces-
dc.title.alternative덴 채움과 소곡면-
dc.typeThesis(Ph.D)-
dc.identifier.CNRN169618/325007-
dc.description.department한국과학기술원 : 수학전공, -
dc.identifier.uid000965280-
dc.contributor.localauthorJin, Gyo-Taek-
dc.contributor.localauthor진교택-
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MA-Theses_Ph.D.(박사논문)
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