一些非自控Emden-Fowler微分方程之研究

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題名	一些非自控Emden-Fowler微分方程之研究 Studies on some nonautonomous emden-fowler differential equations
作者	李宣緯
貢獻者	符聖珍李宣緯
關鍵詞	方程轉換震盪解爆破解
日期	2010
上傳時間	9-May-2016 16:41:52 (UTC+8)
摘要	因有數學符號，無法顯示於此。 Abstract......1 中文摘要.....2 1. Introduction.....3 2. Transformation for a Nonautonomous Ordinary Di erential Equation.....5 2.1 Goals and Previous Results.....5 2.2 Main Results.....7 3. The Solutions for Initial Value Problems and Boundary Value Problems.....12 3.1 Existence and Uniqueness of Initial Value Problem.....12 3.2 Initial Value Problem.....14 3.3 Two-Point Boundary Value Problem.....19 3.4 Three-Point Boundary Value Problem.....19 4. Blow-up Solutions.....21 4.1 On the Scalar Differential Equations.....21 4.2 Estimates for the Life Span of Blow-up Solution.....25 4.3 Properties of Parameters that Affect the Blow-up Time.....28 5. Simulation and Comparison.....32 5.1 Numerical and Approximation Method for the Oscillatory Case.....32 5.2 Numerical and Approximation Method for the Blow-up Case.....37 5.3 Numerical Estimation of Blow-up Time....38 6. Conclusion.....41
參考文獻	[1] Richard Bellman. Stability Theory of Differential Equations. McGraw-Hill Book Company, 1953. [2] L. M. Berkovich. The Generalized Emden-Fowler Equation. Symmetry in Nonlinear Mathematical Physics, 1:155{163, 1997. [3] Y. C. Chen and L. Y. Tsai. Blow-up Solutions of Nonlinear Differential Equations. Applied Mathematics and Computation, 169:366{387, 2005. [4] A. Gricans and F. Sadyrbaev. Lemniscatic Functions in the Theory of the Emden-Fowler Differential Equation. Proceedings Institute of Mathematical and Computer Science, 3, 2003. [5] A. Gricans and F. Sadyrbaev. Explict Solutions of Non-Autonomous Emden-Fowler Type Equations. Proceedings Institute of Mathematical and Computer Science, 5:5{23, 2005. [6] S. Ogorodnikova and F. Sadyrbaev. Estimation of the Number of Solutions to the Nonlinear Second Order Boundary Value Problems. Proceedings Institute of Mathematical and Computer Science, 5:24{32, 2005. [7] S. Ogorodnikova and F. Sadyrbaev. Planar Systems with Critical Points: Multiple Solutions of Two-point Nonlinear Boundary Value Problems. Nonlinear Analysis, 63:243{246, 2005. [8] Edmund Pinney. The Nolinear Differential Equation y`` + p(x)y + cy^3 = 0. Proceedings of the American Mathematical Society, page 681, 1950. [9] James L. Reid. Homogeneous Solution of a Nonliear Differential Equation. Proceedings of the American Mathematical Society, 38:532{536, 1973. [10] Shepley L. Ross. Differential Equations. Wiley, 1984. [11] P. L. Sachdev. Nonlinear Ordinary Differential Equations and Their Applications. M. Dekker, 1991.
描述	碩士國立政治大學應用數學系 97751007
資料來源	http://thesis.lib.nccu.edu.tw/record/#G0097751007
資料類型	thesis

dc.contributor.advisor	符聖珍	zh_TW
dc.contributor.author (Authors)	李宣緯	zh_TW
dc.creator (作者)	李宣緯	zh_TW
dc.date (日期)	2010	en_US
dc.date.accessioned	9-May-2016 16:41:52 (UTC+8)	-
dc.date.available	9-May-2016 16:41:52 (UTC+8)	-
dc.date.issued (上傳時間)	9-May-2016 16:41:52 (UTC+8)	-
dc.identifier (Other Identifiers)	G0097751007	en_US
dc.identifier.uri (URI)	http://nccur.lib.nccu.edu.tw/handle/140.119/95632	-
dc.description (描述)	碩士	zh_TW
dc.description (描述)	國立政治大學	zh_TW
dc.description (描述)	應用數學系	zh_TW
dc.description (描述)	97751007	zh_TW
dc.description.abstract (摘要)	因有數學符號，無法顯示於此。	zh_TW
dc.description.abstract (摘要)	Abstract......1 中文摘要.....2 1. Introduction.....3 2. Transformation for a Nonautonomous Ordinary Di erential Equation.....5 2.1 Goals and Previous Results.....5 2.2 Main Results.....7 3. The Solutions for Initial Value Problems and Boundary Value Problems.....12 3.1 Existence and Uniqueness of Initial Value Problem.....12 3.2 Initial Value Problem.....14 3.3 Two-Point Boundary Value Problem.....19 3.4 Three-Point Boundary Value Problem.....19 4. Blow-up Solutions.....21 4.1 On the Scalar Differential Equations.....21 4.2 Estimates for the Life Span of Blow-up Solution.....25 4.3 Properties of Parameters that Affect the Blow-up Time.....28 5. Simulation and Comparison.....32 5.1 Numerical and Approximation Method for the Oscillatory Case.....32 5.2 Numerical and Approximation Method for the Blow-up Case.....37 5.3 Numerical Estimation of Blow-up Time....38 6. Conclusion.....41	-
dc.description.tableofcontents	Abstract......1 中文摘要.....2 1. Introduction.....3 2. Transformation for a Nonautonomous Ordinary Dierential Equation.....5 2.1 Goals and Previous Results.....5 2.2 Main Results.....7 3. The Solutions for Initial Value Problems and Boundary Value Problems.....12 3.1 Existence and Uniqueness of Initial Value Problem.....12 3.2 Initial Value Problem.....14 3.3 Two-Point Boundary Value Problem.....19 3.4 Three-Point Boundary Value Problem.....19 4. Blow-up Solutions.....21 4.1 On the Scalar Differential Equations.....21 4.2 Estimates for the Life Span of Blow-up Solution.....25 4.3 Properties of Parameters that Affect the Blow-up Time.....28 5. Simulation and Comparison.....32 5.1 Numerical and Approximation Method for the Oscillatory Case.....32 5.2 Numerical and Approximation Method for the Blow-up Case.....37 5.3 Numerical Estimation of Blow-up Time....38 6. Conclusion.....41	en_US
dc.source.uri (資料來源)	http://thesis.lib.nccu.edu.tw/record/#G0097751007	en_US
dc.subject (關鍵詞)	方程轉換	zh_TW
dc.subject (關鍵詞)	震盪解	zh_TW
dc.subject (關鍵詞)	爆破解	zh_TW
dc.title (題名)	一些非自控Emden-Fowler微分方程之研究	zh_TW
dc.title (題名)	Studies on some nonautonomous emden-fowler differential equations	en_US
dc.type (資料類型)	thesis	en_US
dc.relation.reference (參考文獻)	[1] Richard Bellman. Stability Theory of Differential Equations. McGraw-Hill Book Company, 1953. [2] L. M. Berkovich. The Generalized Emden-Fowler Equation. Symmetry in Nonlinear Mathematical Physics, 1:155{163, 1997. [3] Y. C. Chen and L. Y. Tsai. Blow-up Solutions of Nonlinear Differential Equations. Applied Mathematics and Computation, 169:366{387, 2005. [4] A. Gricans and F. Sadyrbaev. Lemniscatic Functions in the Theory of the Emden-Fowler Differential Equation. Proceedings Institute of Mathematical and Computer Science, 3, 2003. [5] A. Gricans and F. Sadyrbaev. Explict Solutions of Non-Autonomous Emden-Fowler Type Equations. Proceedings Institute of Mathematical and Computer Science, 5:5{23, 2005. [6] S. Ogorodnikova and F. Sadyrbaev. Estimation of the Number of Solutions to the Nonlinear Second Order Boundary Value Problems. Proceedings Institute of Mathematical and Computer Science, 5:24{32, 2005. [7] S. Ogorodnikova and F. Sadyrbaev. Planar Systems with Critical Points: Multiple Solutions of Two-point Nonlinear Boundary Value Problems. Nonlinear Analysis, 63:243{246, 2005. [8] Edmund Pinney. The Nolinear Differential Equation y`` + p(x)y + cy^3 = 0. Proceedings of the American Mathematical Society, page 681, 1950. [9] James L. Reid. Homogeneous Solution of a Nonliear Differential Equation. Proceedings of the American Mathematical Society, 38:532{536, 1973. [10] Shepley L. Ross. Differential Equations. Wiley, 1984. [11] P. L. Sachdev. Nonlinear Ordinary Differential Equations and Their Applications. M. Dekker, 1991.	zh_TW

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