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Please use this identifier to cite or link to this item: https://ah.lib.nccu.edu.tw/handle/140.119/86268
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dc.contributor.advisor蔡隆義zh_TW
dc.contributor.advisorTsai, Long-Yien_US
dc.contributor.author陳怡真zh_TW
dc.contributor.authorChen, Yi-Chenen_US
dc.creator陳怡真zh_TW
dc.creatorChen, Yi-Chenen_US
dc.date1998en_US
dc.date.accessioned2016-04-27T03:15:06Z-
dc.date.available2016-04-27T03:15:06Z-
dc.date.issued2016-04-27T03:15:06Z-
dc.identifierB2002001690en_US
dc.identifier.urihttp://nccur.lib.nccu.edu.tw/handle/140.119/86268-
dc.description碩士zh_TW
dc.description國立政治大學zh_TW
dc.description應用數學系zh_TW
dc.description86751010zh_TW
dc.description.abstract在這篇論文中,我們討論具有初始值條件的二階微分方程 □□□□□zh_TW
dc.description.abstractIn this paper we shall consider the initial value problem for second order differential equation of the form □□□□□en_US
dc.description.tableofcontentsList of Figures\r\nList of Tables\r\nIntroduction\r\nChapter1 On the Scalar Differential Equation\r\n1.1 Fundamental Lemmas\r\n 1.2 The Asymptotic Behavior of the Global Solutions\r\n 1.3 Estimates for the Life Span of the Blow-up Solutions\r\n 1.3.1\r\n 1.3.2\r\n 1.4 Blow-up Rate and Blow-up Constant\r\n 1.5 Properties of the Life Span Time\r\n 1.5.1 The Property of\r\n 1.5.2 The Property of 9\r\n 1.5.3 The Behavior of the Blow-up Constant\r\nChapter 2 On The System of Differential Equations\r\n 2.1 Fundamental Lemmas\r\n 2.2 Estimates for the Life Span Time\r\n 2.3 Particular System\r\n 2.3.1 Fundamental Lemmas\r\n 2.3.2 Estimates for the Life Span Time\r\n (I)\r\n (II)\r\nChapter 3 Conclusions\r\n 3.1 The Scalar Differential Equation\r\n 3.1.1 Table\r\n 3.1.2 Examples\r\n 3.2 The System of Differential Equation\r\n 3.2.1 Table\r\n 3.3 Particular System\r\n 3.3.1 Table\r\n 3.3.2 Examples\r\nBibliography\r\nAppendixzh_TW
dc.source.urihttp://thesis.lib.nccu.edu.tw/record/#B2002001690en_US
dc.subject微分方程zh_TW
dc.subject爆破zh_TW
dc.subject爆破速率zh_TW
dc.subject能量方法zh_TW
dc.subject生成時間zh_TW
dc.subjectdifferential equationen_US
dc.subjectblow-upen_US
dc.subjectblow-up rateen_US
dc.subjectblow-up constanten_US
dc.subjectenergy methoden_US
dc.subjectlife-span timeen_US
dc.title非線性微分方程之研究zh_TW
dc.titleSome Studies in the Nonlinear Differential Equationsen_US
dc.typethesisen_US
dc.relation.reference[1] D. O`Regan, Some general existence principles and results for □□□□□(0<t<1), SIAM Journal on Mathematical Analysis, 24, 648-668,(1993).\r\n[2] J. R. Esteban and J. L. Vazquez, On the Equation of Turbulent in One-dimensional Porous Media, Nonlinear Analysis, 10, 1303-1325, (1986).\r\n[3] Jiun-Hon Lin, The Regularity of Solutions for Non-linear Differential Equation □□□□□, Master thesis, National Chengchi University, ( 1999).\r\n[4] Junyu Wang and Wenjie Gao, A Singular Boundary Value Problem for the One-dimensional p -Laplacian, Journal of Mathematical Analysis and Applications, 201, 851-866,(1996).\r\n[5] L. E. Bobisub and D. O`Regan, Existence of Positive Solutions for Singular Ordinary Differential Equations with Nonlinear Boundary Conditions, Proceedings of the American Mathematical Society, 124, 2081-2087, (1996).\r\n[6] M. A. Herrero and J. L. Vazquez, On the Propagation Properties of a Nonlinear Degenerate Parabolic Equation, Communications in Partial Differential Equations, 7, 1381-1402, (1982).\r\n[7] Meng-Rong Li, On the Differential Equation □□□□□, Preprint, National Chengchi University, (1999).\r\n[8] Zuodong Yang, Existence of Positive Solutions for a Class of Singular two Point Boundary Value Problems of Second Order Nonlinear Equation, Applied Mathematics and Mechanics, 17, 465-476, (1996).zh_TW
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