Please use this identifier to cite or link to this item: https://ah.lib.nccu.edu.tw/handle/140.119/83373
題名: 有外力干擾的二階非線性微分方程
Nonlinear second order differential equation with force u``(t)=uP(t)(c1+c2u`(t)q)
作者: 黃金龍
HUANG, JIN-LON
貢獻者: 李明融
黃金龍
HUANG JIN-LON
關鍵詞: 爆破率
爆破常數
爆破時間
日期: 2002
上傳時間: 31-Mar-2016
摘要: 在這一篇論文中,我們討論的是常微分方程u\" =u<sup>P</sup>(C<sub>1</sub>+C2(u`)<sup>q</sup>\")我們發現一些現象,爆破率、爆破常數、爆破時間。而且我們還發現爆破時問與係數之間的關係,我們將在之後討論。
In this paper we work with the ordinary differential equation u\" = u<sup>P</sup>(C<sub>1</sub>+C2(u`)<sup>q</sup>\"). We have found some phenomena, blow-up, blow-up rate, blow-up constant, blow-up time are obtained in this work. Further, we have also found the relationship between blow-up time and blow-up coefficients, we shall detail illustrate it later.
Abstract-----i\r\n中文摘要-----ii\r\n1 Introduction-----1\r\n1.1 The Calligraphy Equation (Li,1999)-----1\r\n1.2 The Existence of Solutions-----2\r\n\r\n2 Blow-up Phenomena for 2 > q ≧1-----6\r\n2.1 Blow-up Rate and Blow-up Constant of u(t)-----10\r\n2.2 Blow-up Rate and Blow-up Constant of u`t)-----11\r\n2.3 Blow-up Rate and Blow-up Constant of u\"\"(t)-----12\r\n\r\n3 Blow-up Phenomena for q = 2-----13\r\n3.1 Blow-up Rate and Blow-up Constant of u(t)-----13\r\n3.2 Blow-up Rate and Blow-up Constant of u`(t)-----14\r\n3.3 Blow-up Rate and Blow-up Constant of u\"\"(t)-----15\r\n\r\n4 Blow-up Phenomena for q > 2-----16\r\n4.1 Blow-up Rate and Blow-up Constant of u`(t)-----17\r\n4.2 Blow-up Rate and Blow-up Constant of u\"\"{t)-----18\r\n\r\n5 Conclusions-----19\r\n5.1 Tables-----19\r\n5.1.1 Blows up Phenomena for u under uo,u1,c2 > 0-----19\r\n5.1.2 Blows up Phenomena for u` under uo,u1,c2 > 0-----19\r\n5.1.3 Blows up Phenomena for u\"\" under uo,u1,c1,c2 > 0-----19\r\n5.2 Properties of Blow-up Constant and Coefficients-----19\r\n5.2.1 The Case of 1 5.2.2 The Case of q= 2-----22\r\n5.3 Properties of Blow-up Time and Coefficients-----23\r\n5.3.1 The Case of 1 5.3.2 The Case of q=2-----25\r\n\r\nReferences-----26
參考文獻: D.H. Griffel, Applied Functional Analysis, 3rd, England, Ellis Horwood, 1985, p.116.\r\nI-Chen Chen, Some Studies in Differential Equation, Preprint, National Chengchi University, 1999.\r\nJiun-Hon Lin, The Regularity of Solutions for Nonlinear Differential Equation u``-u^p=0, Preprint, National Chengchi University, 1999.\r\nMeng-Rong Li, On the Differential Equation u``-u^p=0, Preprint, National Chengchi University, 1999.
描述: 碩士
國立政治大學
應用數學系
88751010
資料來源: http://thesis.lib.nccu.edu.tw/record/#B2002000060
資料類型: thesis
Appears in Collections:學位論文

Files in This Item:
File SizeFormat
index.html115 BHTML2View/Open
Show full item record

Google ScholarTM

Check


Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.