• 多维实分析(第1卷) 杜斯特马特 9787510004520
  • 多维实分析(第1卷) 杜斯特马特 9787510004520
  • 多维实分析(第1卷) 杜斯特马特 9787510004520
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多维实分析(第1卷) 杜斯特马特 9787510004520

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作者[荷兰]杜斯特马特 著

出版社世界图书出版公司

出版时间2009-08

版次1

装帧平装

上书时间2022-07-14

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图书标准信息
  • 作者 [荷兰]杜斯特马特 著
  • 出版社 世界图书出版公司
  • 出版时间 2009-08
  • 版次 1
  • ISBN 9787510004520
  • 定价 49.00元
  • 装帧 平装
  • 开本 24开
  • 纸张 胶版纸
  • 页数 422页
  • 正文语种 英语
【内容简介】
Thisbook,whichisintwoparts,providesanintroductiontothetheoryofvector-valuedfunctionsonEuclideanspace.Wefocusonfourmainobjectsofstudyandinadditionconsidertheinteractionsbetweenthese.VolumeIisdevotedtodifferentiation.DifferentiablefunctionsonRncomefirst,inChapters1through3.Next,differentiablemanifoldsembeddedinRarediscussed,inChapters4and5.InVolume11wetakeupintegration.Chapter6dealswiththetheoryofn-dimensionalintegrationoverR.Finally,inChapters7and8lower-dimensionalintegrationoversubmanifoldsofRnisdeveloped;particularattentionispaidtovectoranalysisandthetheoryofdifferentialforms,whicharetreatedindependentlyfromeachother.Generallyspeaking,theemphasisisongeometricaspectsofanalysisratherthanonmattersbelongingtofunctionalanalysis.
【目录】
VolumeⅠ
Preface
Acknowledgments
Introduction
1Continuity
1.1Innerproductandnorm
1.2Openandclosedsets
1.3Limitsandcontinuousmappings
1.4Compositionofmappings
1.5Homeomorphisms
1.6Completeness
1.7Contractions
1.8Compactnessanduniformcontinuity
1.9Connectedness

2Differentiation
2.1Linearmappings
2.2Differentiablemappings
2.3Directionalandpartialderivatives
2.4Chainrule
2.5MeanValueTheorem
2.6Gradient
2.7Higher-orderderivatives
2.8Taylor'sformula
2.9Criticalpoints
2.10Commutinglimitoperations

3InverseFunctionandImplicitFunctionTheorems
3.1Diffeomorphisms
3.2InverseFunctionTheorems
3.3ApplicationsoflnverseFunctionTheorems
3.4Implicitlydefinedmappings
3.5ImplicitFunctionTheorem
3.6ApplicationsoftheImplicitFunctionTheorem
3.7ImplicitandInverseFunctionTheoremsonC

4Manifolds
4.1Introductoryremarks
4.2Manifolds
4.3ImmersionTheorem
4.4Examplesofimmersions
4.5SubmersionTheorem
4.6Examplesofsubmersions
4.7Equivalentdefinitionsofmanifold
4.8Morse'sLemma

5TangentSpaces
5.1Definitionoftangentspace
5.2Tangentmapping
5.3Examplesoftangentspaces
5.4MethodofLagrangemultipliers
5.5Applicationsofthemethodofmultipliers
5.6Closerinvestigationofcriticalpoints
5.7Gaussiancurvatureofsurface
5.8CurvatureandtorsionofcurveinR3
5.9One-parametergroupsandinfinitesimalgenerators
5.10LinearLiegroupsandtheirLiealgebras
5.11Transversality
Exercises
ReviewExercises
ExercisesforChapter1
ExercisesforChapter2
ExercisesforChapter3
ExercisesforChapter4
ExercisesforChapter5
Notation
Index
VolumeⅡ
Preface
Acknowledgments
Introduction

6Integration
6.1Rectangles
6.2Riemannintegrability
6.3Jordanmeasurability
6.4Successiveintegration
6.5Examplesofsuccessiveintegration
6.6ChangeofVariablesTheorem:formulationandexamples
6.7Partitionsofunity
6.8ApproximationofRiemannintegrablefunctions
6.9ProofofChangeofVariablesTheorem
6.10AbsoluteRiemannintegrability
6.11Applicationofintegration:Fouriertransformation
6.12Dominatedconvergence
6.13Appendix:twootherproofsofChangeofVariablesTheorem

7IntegrationoverSubmanifolds
7.1Densitiesandintegrationwithrespecttodensity
7.2AbsoluteRiemannintegrabilitywithrespecttodensity
7.3Euclideand-dimensionaldensity
7.4ExamplesofEuclideandensities
7.5Opensetsatonesideoftheirboundary
7.6Integrationofatotalderivative
7.7Generalizationsoftheprecedingtheorem
7.8Gauss'DivergenceTheorem
7.9ApplicationsofGauss'DivergenceTheorem

8OrientedIntegration
8.1Lineintegralsandpropertiesofvectorfields
8.2Antidifferentiation
8.3Green'sandCauchy'sIntegralTheorems
8.4Stokes'IntegralTheorem
8.5ApplicationsofStokes'IntegralTheorem
8.6Apotheosis:differentialformsandStokes'Theorem.
8.7Propertiesofdifferentialforms
8.8Applicationsofdifferentialforms
8.9HomotopyLemma
8.10Poincare'sLemma
8.11Degreeofmapping
Exercises
ExercisesforChapter6
ExercisesforChapter7
ExercisesforChapter8
Notation
Index
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