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带端点3阶导数的Simpson修正公式 总被引:2,自引:0,他引:2
给出了一个带端点3阶导数的Simpson修正公式,并给出该公式的截断误差,分析了相应的复化公式的收敛阶.复化带端点3阶导数的Simpson修正公式,只比复化Simpson公式多计算2个端点的3阶导数各1次,其收敛阶却比复化Simpson公式提高了2阶.数值算例验证了理论分析的正确性. 相似文献
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矩形校正公式的误差分析 总被引:1,自引:0,他引:1
This paper presents truncation errors among Corrector Formula for left Rectangular rule and Corrector Formula for middle Rectangular rule respectively.It also displays an analysis on convergence order of compound corrector formulas for rectangular rule.Examples of numerical calculation have validated theoretical analysis. 相似文献
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Simpson校正公式 总被引:3,自引:1,他引:2
给出了Simpson校正公式的截断误差,分析了复化Simpson校正公式的收敛阶.数值算例验证了理论分析的正确性. 相似文献
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§ 1. TheoreticalBasis Manydirectmethodsonlyusetargetfunction(x)andconfinedfunctionGk(x) (k=1 ,2 ,… ,l;listhenumberofconfinedfunction)oftheirfunctionalvaluesateveryknownfeasiblepoints,withoutusingtheconnectionofthesefunctionalvaluesandthefunctionalvaluesatotherfeasiblepointswithintheadjacentdomainsoftheknownfeasiblepoints.Utilizingtheseconnections,weareabletousethefunctionvalueataknownpointtodeterminethefunctionvalueatanotherbetterfeasiblepoint.Bymaintainingcertainfeasiblepointsanddedu… 相似文献
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61.FundamentalConceptsDefinitionlSupposef:A-Bisamapping,defineKer.f={(x,y)Ix,yeA,f(x)=f(y)}Im'f=lBU(ImfXImf)Lemma1lff:A-Bisamappingg,tl1enKer'fisA)secluivalencerelation,In1'j.isB,sequivalencerelation.Theproofiseasy,weomitithere.Definition2ThelimitedsequenceofR-semimoduleI1omomorphism-flf2f3f.-lf"A.-A,-A=-.-'-A"-,-A"iscalled*exact,ifIm.f=Ker'f-,(1相似文献
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In this Paper,the T points of meromorphic functions are defined and existence of the T points is showed in the Unit disk.we also prove T point must be J point. 相似文献
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In this paper,the characteristic function of the derivative of meromorphic func- tion is studied.A expression of characteristic function T(r,f~1)is given. 相似文献
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改进的Cotes公式及其误差分析 总被引:1,自引:1,他引:0
The truncation error of improved Cotes formula is presented in this paper.It also displays an analysis on convergence order of improved Cotes formula.Examples of numerical calculation is given in the end. 相似文献
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