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dc.contributor.author박가현-
dc.creator박가현-
dc.date.accessioned2016-08-25T06:08:09Z-
dc.date.available2016-08-25T06:08:09Z-
dc.date.issued1997-
dc.identifier.otherOAK-000000026127-
dc.identifier.urihttps://dspace.ewha.ac.kr/handle/2015.oak/181406-
dc.identifier.urihttp://dcollection.ewha.ac.kr/jsp/common/DcLoOrgPer.jsp?sItemId=000000026127-
dc.description.abstractWe show that M_(β) : L^(p)(w)→L^(p)(w) if and only if w∈A_(p.β) for some bases β. Also we show that when w∈A_(p.β), V_(q)(w) covering property implies the boundedness of M_(β), for any basis β.;어떤 적당한 bases β에 대해 M_(β):L^(p)(w)→L^(p)(w)와 w∈A_(p,β)는 필요충분조건임을 보인다. 또한 임의의 basis β에 대해 w∈A_(p,β)이면 V_(q)(w) covering property가 M_(β)의 유계성을 위한 충분조건임을 보인다.-
dc.description.tableofcontentsCONTENTS = ⅰ ABSTRACT = ⅱ Ⅰ. Introduction = 1 Ⅱ. Weight Norm Inequalities for Maximal Fuctions with respect to Cubes and One-Parameter Family of Rectangles = 5 Ⅲ. Weight Norm Inequality for Maximal Fucntion with respect to Rectangle Basis = 10 REFERENCES = 20 논문초록 = 21-
dc.formatapplication/pdf-
dc.format.extent485478 bytes-
dc.languageeng-
dc.publisher이화여자대학교 대학원-
dc.subjectWeighted Norm-
dc.subjectInequalities-
dc.subjectMaximal Functions-
dc.titleWeighted Norm Inequalities for Maximal Functions with respect to Some Bases-
dc.typeMaster's Thesis-
dc.format.pageii, 21 p.-
dc.identifier.thesisdegreeMaster-
dc.identifier.major대학원 수학과-
dc.date.awarded1997. 2-
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