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1、NumericalAnalysisDamingLiDepartmentofMathematics,ShanghaiJiaoTongUniversity,Shanghai,200240,ChinaEmail:lidaming@sjtu.edu.cnOctober14,2014DamingLiNumericalAnalysisExistenceandUniquenessofSolutionsConsideraninitial-valueproblem(x′=f(t,x)x(t0)=x0Herexisanunknownfunctionoft,wherex′=dx(t)/dt.Forexamp
2、le,(x′=xtan(t+3)x(−3)=1Theanalyticsolutionisx(t)=sec(t+3).Typically,fortheaboveproblem,analyticsolutionsarenotavailableandnumericalmethodsmustbeemployed.DamingLiNumericalAnalysisExistenceandUniquenessofSolutionsIffiscontinuousinarectangleRcenteredat(t0,x0),sayR={(t,x):
3、t−t0
4、≤α,
5、x−x0
6、≤β}thenthein
7、itial-valueproblemhasasolutionx(t)for
8、t−t0
9、≤min(α,β/M),whereMisthemaximumof
10、f(t,x)
11、intherectangleR.DamingLiNumericalAnalysisExistenceandUniquenessofSolutionsProvethattheinitial-valueproblem(x′=(t+sinx)2x(0)=3hasasolutionontheinterval−1≤t≤1.Takingf(t,x)=(t+sinx)2and(t,x)=(0,3).Therectangleis00R={
12、(t,x):
13、t
14、≤α,
15、x−3
16、≤β}Themagnitudeoffisboundedby
17、f(t,x)
18、≤(α+1)2≡MWewantmin(α,β/M)≥1,andsowecanletα=1.ThenM=4,andourobjectiveismetbylettingβ≥4.DamingLiNumericalAnalysisExistenceandUniquenessofSolutionsIffiscontinuousinthestripa≤t≤b,−∞19、f(t,x1)−f(t,x2)
20、≤L
21、x1−x2
22、the
23、ntheinitial-valueproblemhasauniquesolutionintheinterval[a,b].DamingLiNumericalAnalysisTaylor-SeriesMethod(x′=cost−sinx+t2x(−1)=3h2h3h4x(t+h)=x(t)+hx′(t)+x(2)(t)++x(3)(t)+x(4)(t)+···2!3!4!x(2)=−sint−x′cosx+2tx(3)=−cost−x(2)cosx+(x′)2sint+2x(4)=sint−x(3)cosx+3x′x(2)sinx+(x′)3cosxSubstitutingallthe
24、derivativesattuptofourthorderandtruncatingtotheorderh4,wecancalculatex(t+h)withthetruncationerrorO(h5).DamingLiNumericalAnalysisTaylor-SeriesMethodAlthoughthetruncationerrorcanbeveryhighbyTaylor-seriesmethod,therearemanydisadvantagesinthismethod.First,themethoddependsonrepeateddifferentiationoft
25、hegivendifferentialequation.Hence,thefunctionf(t,x)mustpossesspartialderivativesintheregionwherethesolutioncurvepassesinthetx-plane.Suchanassumptionis,ofcourse,notnecessaryfortheexistenceofasolution.Secondly,variousderivativ
