康托爾集之法瓦德長之極限行為

吳悠; Yu Wu

請用此 Handle URI 來引用此文件： http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/88698

完整後設資料紀錄

DC 欄位	值	語言
dc.contributor.advisor	沈俊嚴	zh_TW
dc.contributor.advisor	Chun-Yen Shen	en
dc.contributor.author	吳悠	zh_TW
dc.contributor.author	Yu Wu	en
dc.date.accessioned	2023-08-15T17:25:04Z	-
dc.date.available	2023-11-10	-
dc.date.copyright	2023-08-15	-
dc.date.issued	2023	-
dc.date.submitted	2023-07-28	-
dc.identifier.citation	M. Bateman and A. Volberg. An estimate from below for the Buffon needle probability of the four-corner Cantor set. Mathematical Research Letters, 17(5):959-967, 2010. A.S. Besicovitch. Tangential properties of sets and arcs of infinite linear measure. Bulletin of the American Mathematical Society, 60(3):353-359, 1960. F. Nazarov, Y. Peres, and A. Volberg. The power law for the Buffon needle probbility of the four-corner Cantor set. St. Petersburg Mathematical Journal, 34(3):61-72, 2011. Y. Peres and B. Solomyak. How likely is Buffon's needle to fall near a planar Cantor set? Pacific Journal of Mathematics, 204(2):473-496, 2002. A. Volberg. Buffon needle: The probability of Buffon needle to land near Cantor set. EIMI Winter School, 2021.	-
dc.identifier.uri	http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/88698	-
dc.description.abstract	在過去對於古典布豐投針的研究中，法瓦德長之概念被提出。法瓦德長是一種以集合對各個方向之投影來度量的幾何量。在R2中一個特定的集合，四角康托爾集，之法瓦德長已被研究數年。根據別西科維奇投影定理，四角康托爾集之法瓦德長為零。一個自然的問題是研究對於其康托爾方塊之法瓦德長極限行為之量化描述。本篇論文之目的在於調查過去關於四角康托爾集之法瓦德長問題，及討論將過去發展之方法推廣至五角康托爾集之可行性。	zh_TW
dc.description.abstract	From the studies of classical Buffon needle problem, the concept of Favard length had been investigated. It is a geometric quantity of a set by measuring its projections behaviors on lines. In R2, a particular case, the four-corner Cantor set, has been studied for years. By Besicovitch projection theorem, the Favard length of four-corner Cantor set is zero. A nature question that was asked is to establish a quantitative rate of the convergence of Favard length in terms of its n-th generation. The purposes of this thesis are to survey the limit behavior of Favard length of Cantor set and Cantor-like set in R2 and discuss if the pioneer’s result can be generalized to five-corner Cantor set.	en
dc.description.provenance	Submitted by admin ntu (admin@lib.ntu.edu.tw) on 2023-08-15T17:25:04Z No. of bitstreams: 0	en
dc.description.provenance	Made available in DSpace on 2023-08-15T17:25:04Z (GMT). No. of bitstreams: 0	en
dc.description.tableofcontents	1. Introduction p.1 1.1. Favard length of standard four-corner Cantor set p.1 1.2. Surveys and historical notes p.3 1.3. Favard length of five-corner Cantor set p.3 2. Lower bound estimate p.6 2.1. Counting function p.6 2.2. Pairing of cubes p.7 3. Upper bound estimate 3.1. Preparation p.13 3.2. Good direction p.18 3.3. L^2 norm of counting function f_{t,n} p.22 A. Notations p.36 B. Reference p.37	-
dc.language.iso	en	-
dc.subject	幾何測度論	zh_TW
dc.subject	別西科維奇投影	zh_TW
dc.subject	法瓦德長	zh_TW
dc.subject	康托爾集	zh_TW
dc.subject	Cantor sets	en
dc.subject	Favard length	en
dc.subject	Besicovitch projection	en
dc.subject	geometric-measure theory	en
dc.title	康托爾集之法瓦德長之極限行為	zh_TW
dc.title	Limit Behavior of Favard Length of Cantor sets	en
dc.type	Thesis	-
dc.date.schoolyear	111-2	-
dc.description.degree	碩士	-
dc.contributor.oralexamcommittee	陳逸昆;李冀	zh_TW
dc.contributor.oralexamcommittee	I-Kun Chen;Ji Li	en
dc.subject.keyword	法瓦德長,康托爾集,別西科維奇投影,幾何測度論,	zh_TW
dc.subject.keyword	Favard length,Cantor sets,Besicovitch projection,geometric-measure theory,	en
dc.relation.page	37	-
dc.identifier.doi	10.6342/NTU202302276	-
dc.rights.note	同意授權(限校園內公開)	-
dc.date.accepted	2023-07-31	-
dc.contributor.author-college	理學院	-
dc.contributor.author-dept	數學系	-
顯示於系所單位：	數學系

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