几何分析手册(第Ⅰ卷)(英文)
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作者季理真 编
出版社高等教育出版社
出版时间2008-08
版次1
装帧精装
货号2~331
上书时间2024-09-13
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图书标准信息
- 作者 季理真 编
- 出版社 高等教育出版社
- 出版时间 2008-08
- 版次 1
- ISBN 9787040252880
- 定价 128.00元
- 装帧 精装
- 开本 16开
- 纸张 胶版纸
- 页数 676页
- 字数 820千字
- 正文语种 英语
- 【内容简介】
- GeometricAnalysiscombinesdifferentialequationsanddifferentialgeometry.Animportantaspectistosolvegeometricproblemsbystudyingdifferentialequations.BesidessomeknownlineardifferentialoperatorssuchastheLaplaceoperator,manydifferentialequationsarisingfromdifferentialgeometryarenonlinear.AparticularlyimportantexampleistheMonge-Ampereequation.Applicationstogeometricproblemshavealsomotivatednewmethodsandtechniquesindifferen-tialequations.Thefieldofgeometricanalysisisbroadandhashadmanystrikingapplications.Thishandbookofgeometricanalysisprovidesintroductionstoandsurveysofimportanttopicsingeometricanalysisandtheirapplicationstorelatedfieldswhichisintendtobereferredbygraduatestudentsandresearchersinrelatedareas.
- 【目录】
-
NumericalApproximationstoExtremalMetricsonToricSurfaces
1Introduction
2Theset-up
2.1Algebraicmetrics
2.2Decompositionofthecurvaturetensor
2.3Integration
3Numericalalgorithms:balancedmetricsandrefinedapproximations
4Numericalresults
4.1Thehexagon
4.2Thepentagon
4.3Theoctagon
4.4Theheptagon
5Conclusions
References
KahlerGeometryonToricManifolds,andsomeotherManifoldswithLargeSymmetry
Introduction
1Background
1.1Gaugetheoryandholomorphicbundles
1.2Symplecticandcomplexstructures
1.3Theequations
2Toricmanifolds
2.1Localdifferentialgeometry
2.2Theglobalstructure
2.3Algebraicmetricsandasymptotics
2.4Extremalmetricsontoricvarieties
3ToricFanomanifolds
3.1TheKahler-Riccisolitonequation
3.2Continuitymethod,convexityandafundamentalinequality
3.3Aprioriestimate
3.4ThemethodofWangandZhu
4Variantsoftoricdifferentialgeometry
4.1Multiplicity-freemanifolds
4.2Manifoldswithadenseorbit
5TheMukai-Umemuramanifoldanditsdeformations
5.1Mukai'sconstruction
5.2Topologicalandsymplecticpicture
5.3Deformations
5.4Thea-invariant
References
GluingConstructionsofSpecialLagrangianCones
1Introduction
2SpecialLagrangianconesandspecialLegendriansubmanifoldsofS2n-1
3CohomogeneityonespecialLegendriansubmanifoldsofS2n-1
4ConstructionoftheinitialalmostspecialLegendriansubmanifolds
5Thesymmetrygroupandthegeneralframeworkforcorrectingtheinitialsurfaces
6Thelinearizedequation
7UsingtheGeometricPrincipletoprescribetheextendedsubstitutekernel
8Themainresults
ASymmetriesandquadratics
References
HarmonicMappings
1Introduction
2HarmonicmappingsfromtheperspectiveofRiemanniangeometry
2.1HarmonicmappingsbetweenRiemannianmanifolds:definitionsandproperties
2.2Theheatflowandharmonicmappingsintononpositivelycurvedmanifolds
2.3HarmonicmappingsintoconvexregionsandapplicationstotheBernsteinproblem
3Harmonicmappingsfromtheperspectiveofabstractanalysisandconvexitytheory
3.1Existence
3.2Regularity
3.3Uniquenessandsomeapplications
4HarmonicmappingsinKahlerandalgebraicgeometry
4.1Rigidityandsuperrigidity
4.2Harmonicmapsandgrouprepresentations
4.3Kahlergroups
4.4Quasiprojectivevarietiesandharmonicmappingsofinfiniteenergy
5HarmonicmappingsandRiemannsurfaces
5.1FamiliesofRiemannsurfaces
……
HarmonicFunctionsonCompleteRiemannianManifolds
ComplexityofSolutionsofPartialDifferentialEquations
VariationalPrinciplesonTriangulatedSurfaces
AsymptoticStructuresintheGeometryofStabilityandExtremalMetrics
StableConstantMeanCurvatureSurfaces
AGeneralAsymptoticDecayLemmaforEllipticProblems
UniformizationofOpenNonnegativelyCurvedK/ihlerManifoldsinHigherDimensions
GeometryofMeasures:HarmonicAnalysisMeetsGeometricMeasureTheory
TheMongeAmpereEequationanditsGeometricAapplications
LecturesonMeanCurvatureFlowsinHigherCodimensions
LocalandGlobalAnalysisofEigenfunctionsonRiemannianManifolds
Yau’SFormofSchwarzLemmaandArakelovInequalityOnModuliSpacesofProjectiveManifolds
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