DSpace at EWHA: Study of the maximal function and A

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DC Field	Value	Language
dc.contributor.author	김희진	-
dc.creator	김희진	-
dc.date.accessioned	2016-08-25T06:08:49Z	-
dc.date.available	2016-08-25T06:08:49Z	-
dc.date.issued	2001	-
dc.identifier.other	OAK-000000029139	-
dc.identifier.uri	https://dspace.ewha.ac.kr/handle/2015.oak/181793	-
dc.identifier.uri	http://dcollection.ewha.ac.kr/jsp/common/DcLoOrgPer.jsp?sItemId=000000029139	-
dc.description.abstract	함수 Mf를 다음과 같이 정의하자. ◁그림삽입▷(원문을 참조하세요) 그러면 p를 1보다 큰 임의의 실수라 했을 때 Mf가 Strong-type (p, p)이기 위한 필요 충분조건이 A_(p)임을 증명한다.;This thesis is concerned with norm inequalities for the maximal function. We show that for 1 < P < ∞, the maximal function. ▷그림참조◁ is strong-type ( p, p) with respect to the weight w if and only if w∈A_(p), i.e., ▷그림참조◁ where	-
dc.description.abstract	B	-
dc.description.abstract	is the Lebesgue measure of B and the supremum is taken over all balls B.	-
dc.description.tableofcontents	ABSTRACT Introduction = 1 1. The class A_(p) = 3 2. Two further properties of A_(p) = 8 3. Weighted norm Inequality for the maximal functions = 17 References = 24 논문초록 = 25;contents ABSTRACT Introduction = 1 1. The class A_(p) = 3 2. Two further properties of A_(p) = 8 3. Weighted norm Inequality for the maximal functions = 17 References = 24 논문초록 = 25	-
dc.format	application/pdf	-
dc.format.extent	557065 bytes	-
dc.language	eng	-
dc.publisher	이화여자대학교 대학원	-
dc.subject	maximal	-
dc.subject	function	-
dc.subject	A_(p)-weights	-
dc.subject	Mathematics	-
dc.title	Study of the maximal function and A_(p)-weights	-
dc.type	Master's Thesis	-
dc.format.page	23 p.	-
dc.identifier.thesisdegree	Master	-
dc.identifier.major	대학원 수학과	-
dc.date.awarded	2001. 8	-