孔夫子旧书网-网上买书卖书、古旧书收藏品交易平台 孔夫子旧书网-网上买书卖书、古旧书收藏品交易平台 占位居中 孔夫子旧书网-网上买书卖书、古旧书收藏品交易平台
商品
拍卖区
在售
已售
搜索历史
搜索
高级搜索

现代几何方法和应用(第3卷)

现代几何方法和应用(第3卷)
分享
扫描下方二维码分享到微信
打开微信,点击右上角”+“,
使用”扫一扫“即可将网页分享到朋友圈。
作者: ,
出版社: 世界图书出版公司
1999-11
版次: 1
ISBN: 9787506212649
定价: 71.00
装帧: 平装
开本: 24开
纸张: 胶版纸
页数: 416页
分类: 自然科学
22人买过
  • Inexpositionsoftheelementsoftopologyitiscustomaryforhomologytobegivenafundamentalrole.SincePoincare,wholaidthefoundationsoftopology,homologytheoryhasbeenregardedastheappropriateprimarybasisforanintroductiontothemethodsofalgebraictopology.Fromhomotopytheory,ontheotherhand,onlythefundamentalgroupandcovering-spacetheoryhavetraditionallybeenincludedamongthebasicinitialconcepts.Essentiallyallelementaryclassicaltextbooksoftopology(thebestofwhichis,intheopinionofthepresentauthors,SeifertandThrelfall'sATextbookofTopology)beginwiththehomologytheoryofoneoranotherclassofcomplexes.Onlyatalaterstage(andthenstillfromahomologicalpointofview)dofibre-spacetheoryandthegeneralproblemofclassifyinghomotopyclassesofmaps(homotopytheory)comeinforconsideration.However,methodsdevelopedininvestigatingthetopologyofdifferentiablemanifolds,andintensivelyelaboratedfromthe1930sonwards(byWhitneyandothers),nowpermitawholesalereorganizationofthestandardexpositionOfthefundamentalsofmoderntopology.Inthisnewapproach,whichresemblesmorethatofclassicalanalysis,thesefundamentalsturnouttoconsistprimarilyoftheelementarytheoryofsmoothmanifolds,homotopytheorybasedonthese,andsmoothfibrespaces.Furthermore,overthedecadeofthe1970sitbecameclearthatexactlythiscomplexoftopologicalideasandmethodswereprovingtobefundamentallyapplicableinvariousareasofmodernphysics. Contents
    Preface
    CHAPTER1HomologyandCohomology.ComputationalRecipes
    1.CohomologygroupsasclassesofcloseddifferentialformsTheirhomotopyinvariance
    2.Thehomologytheoryofalgebraiccomplexes
    3.Simplicialcomplexes.TheirhomologyandcohomologygroupsTheclassificationofthetwo-dimensionalclosedsurfaces
    4.Attachingcellstoatopologicalspace.Cellspaces.Theoremsonthereductionofcellspaces.Homologygroupsandthefundamentalgroupsofsurfacesandcertainothermanifolds
    5.Thesingularhomologyandcohomologygroups.Theirhomotogyinvariance.Theexactsequenceofapair.Relativehomologygroups
    6.Thesingularhomologyofcellcomplexes.Itsequivalencewithcellhomology.Poincaredualityinsimplicialhomology
    7.Thehomologygroupsofaproductofspaces.Multiplicationincohomologyrings.ThecohomologytheoryofH-spacesandLiegroups.Thecohomologyoftheunitarygroups
    8.Thehomologytheoryoffibrebundles(skewproducts)
    9.Theextensionproblemformaps,homotopies,andcross-sectionsObstructioncohomologyclasses
    9.1.Theextensionproblemformaps
    9.2.Theextensionproblemforhomotopies
    9.3.Theextensionproblemforcross-sections
    10.Homologytheoryandmethodsforcomputinghomotopygroups.
    TheCartan-Serretheorem.Cohomologyoperations.Vectorbundles
    10.1.Theconceptofacohomologyopcration.Examples
    10.2.CohomologyoperationsandEilenberg-MacLanecomplexes
    10.3.Computationoftherationalhomotopygroups
    10.4.Applicationtovectorbundles.Characteristicclasses
    10.5.ClassificationoftheSteenrodoperationsinlowdimensions
    10.6.Computationofthefirstfewnontrivialstablehomotopygroupsofpheres
    10.7.Stablehomotopyclassesofmapsofcellcomplexes
    11.Homologytheoryandthefundamentalgroup
    12.ThecohomologygroupsofhyperellipticRiemannsurfaces.Jacobitori.eodesicsonmulti-axisellipsoids.Relationshiptofinite-gappotentials
    13.ThesimplestpropertiesofKahlermanifoldsAbeliantori
    14.Sheafcohomology

    CHAPTER2CriticalPointsofSmoothFunctionsandHomologyTheory
    15.Morsefunctionsandcellcomplexes
    16.TheMorseinequalities
    17.Morse-Smalefunctions.Handles.Surfaces
    18.Poincareduality
    19.CriticalpointsofsmoothfunctionsandtheLyusternik-Shnirelmancategoryofamanifold
    20.CriticalmanifoldsandtheMorseinequalities.Functionswithsymmetry
    21.Criticalpointsoffunctionalsandthetopologyofthepathspace(m)
    22.Applicationsoftheindextheorem
    23.Theperiodicproblemofthecalculusofvariations
    24.Morsefunctionson3-dimensioalmanifoldsandHeegaardsplittings
    25.UnitaryBottperiodicityandhigher-dimensionalvariationalproblems
    25.1.Thetheoremonunitaryperiodicity
    25.2.Unitaryperiodicityviathetwo-dimensionalcalculusofvariations
    25.3.Onthogonalperiodicityviathehigher-dimensionalcalculusofvariations
    26.Morsetheoryandcertainmotionsintheplanarn-bodyproblem

    CHAPTER3CobordismsandSmoothStructures
    27.Characteristicnumbers.Cobordisms.CyclesandsubmanifoldsThesignatureofamanifold
    27.1.Statementoftheproblem.ThesimplestfactsaboutcobordismsThesignature
    27.2.Thomcomplexes.Calculationofcobordisms(modulotorsion)Thesignatureformula.Realizationofcyclesassubmanifolds
    27.3.Someapplicationsofthesignaturefonnula.Thesignatureandtheproblemoftheinvarianceofclasses
    28.Smoothstructuresonthe7-dimensionalsphere.Theclassificationproblemforsmoothmanifolds(normalinvariants).Reidemeistertorsionandthefundamentalhypothesis(Hauptvermutung)ofcombinatorialtopology
    Bibliography
    APPENDIX1(byS.P.Novikov)
    AnAnalogueofMorseTheoryforMany-ValuedFunctionsCertainPropertiesofPoissonBrackets
    APPENDIX2(byA.T.Fomenko)Plateau'sProblem.SpectralBordismsandGloballyMinimalSurfacesinRiemannianManifolds
    Index
    ErratatoParts1and11
  • 内容简介:
    Inexpositionsoftheelementsoftopologyitiscustomaryforhomologytobegivenafundamentalrole.SincePoincare,wholaidthefoundationsoftopology,homologytheoryhasbeenregardedastheappropriateprimarybasisforanintroductiontothemethodsofalgebraictopology.Fromhomotopytheory,ontheotherhand,onlythefundamentalgroupandcovering-spacetheoryhavetraditionallybeenincludedamongthebasicinitialconcepts.Essentiallyallelementaryclassicaltextbooksoftopology(thebestofwhichis,intheopinionofthepresentauthors,SeifertandThrelfall'sATextbookofTopology)beginwiththehomologytheoryofoneoranotherclassofcomplexes.Onlyatalaterstage(andthenstillfromahomologicalpointofview)dofibre-spacetheoryandthegeneralproblemofclassifyinghomotopyclassesofmaps(homotopytheory)comeinforconsideration.However,methodsdevelopedininvestigatingthetopologyofdifferentiablemanifolds,andintensivelyelaboratedfromthe1930sonwards(byWhitneyandothers),nowpermitawholesalereorganizationofthestandardexpositionOfthefundamentalsofmoderntopology.Inthisnewapproach,whichresemblesmorethatofclassicalanalysis,thesefundamentalsturnouttoconsistprimarilyoftheelementarytheoryofsmoothmanifolds,homotopytheorybasedonthese,andsmoothfibrespaces.Furthermore,overthedecadeofthe1970sitbecameclearthatexactlythiscomplexoftopologicalideasandmethodswereprovingtobefundamentallyapplicableinvariousareasofmodernphysics.
  • 目录:
    Contents
    Preface
    CHAPTER1HomologyandCohomology.ComputationalRecipes
    1.CohomologygroupsasclassesofcloseddifferentialformsTheirhomotopyinvariance
    2.Thehomologytheoryofalgebraiccomplexes
    3.Simplicialcomplexes.TheirhomologyandcohomologygroupsTheclassificationofthetwo-dimensionalclosedsurfaces
    4.Attachingcellstoatopologicalspace.Cellspaces.Theoremsonthereductionofcellspaces.Homologygroupsandthefundamentalgroupsofsurfacesandcertainothermanifolds
    5.Thesingularhomologyandcohomologygroups.Theirhomotogyinvariance.Theexactsequenceofapair.Relativehomologygroups
    6.Thesingularhomologyofcellcomplexes.Itsequivalencewithcellhomology.Poincaredualityinsimplicialhomology
    7.Thehomologygroupsofaproductofspaces.Multiplicationincohomologyrings.ThecohomologytheoryofH-spacesandLiegroups.Thecohomologyoftheunitarygroups
    8.Thehomologytheoryoffibrebundles(skewproducts)
    9.Theextensionproblemformaps,homotopies,andcross-sectionsObstructioncohomologyclasses
    9.1.Theextensionproblemformaps
    9.2.Theextensionproblemforhomotopies
    9.3.Theextensionproblemforcross-sections
    10.Homologytheoryandmethodsforcomputinghomotopygroups.
    TheCartan-Serretheorem.Cohomologyoperations.Vectorbundles
    10.1.Theconceptofacohomologyopcration.Examples
    10.2.CohomologyoperationsandEilenberg-MacLanecomplexes
    10.3.Computationoftherationalhomotopygroups
    10.4.Applicationtovectorbundles.Characteristicclasses
    10.5.ClassificationoftheSteenrodoperationsinlowdimensions
    10.6.Computationofthefirstfewnontrivialstablehomotopygroupsofpheres
    10.7.Stablehomotopyclassesofmapsofcellcomplexes
    11.Homologytheoryandthefundamentalgroup
    12.ThecohomologygroupsofhyperellipticRiemannsurfaces.Jacobitori.eodesicsonmulti-axisellipsoids.Relationshiptofinite-gappotentials
    13.ThesimplestpropertiesofKahlermanifoldsAbeliantori
    14.Sheafcohomology

    CHAPTER2CriticalPointsofSmoothFunctionsandHomologyTheory
    15.Morsefunctionsandcellcomplexes
    16.TheMorseinequalities
    17.Morse-Smalefunctions.Handles.Surfaces
    18.Poincareduality
    19.CriticalpointsofsmoothfunctionsandtheLyusternik-Shnirelmancategoryofamanifold
    20.CriticalmanifoldsandtheMorseinequalities.Functionswithsymmetry
    21.Criticalpointsoffunctionalsandthetopologyofthepathspace(m)
    22.Applicationsoftheindextheorem
    23.Theperiodicproblemofthecalculusofvariations
    24.Morsefunctionson3-dimensioalmanifoldsandHeegaardsplittings
    25.UnitaryBottperiodicityandhigher-dimensionalvariationalproblems
    25.1.Thetheoremonunitaryperiodicity
    25.2.Unitaryperiodicityviathetwo-dimensionalcalculusofvariations
    25.3.Onthogonalperiodicityviathehigher-dimensionalcalculusofvariations
    26.Morsetheoryandcertainmotionsintheplanarn-bodyproblem

    CHAPTER3CobordismsandSmoothStructures
    27.Characteristicnumbers.Cobordisms.CyclesandsubmanifoldsThesignatureofamanifold
    27.1.Statementoftheproblem.ThesimplestfactsaboutcobordismsThesignature
    27.2.Thomcomplexes.Calculationofcobordisms(modulotorsion)Thesignatureformula.Realizationofcyclesassubmanifolds
    27.3.Someapplicationsofthesignaturefonnula.Thesignatureandtheproblemoftheinvarianceofclasses
    28.Smoothstructuresonthe7-dimensionalsphere.Theclassificationproblemforsmoothmanifolds(normalinvariants).Reidemeistertorsionandthefundamentalhypothesis(Hauptvermutung)ofcombinatorialtopology
    Bibliography
    APPENDIX1(byS.P.Novikov)
    AnAnalogueofMorseTheoryforMany-ValuedFunctionsCertainPropertiesofPoissonBrackets
    APPENDIX2(byA.T.Fomenko)Plateau'sProblem.SpectralBordismsandGloballyMinimalSurfacesinRiemannianManifolds
    Index
    ErratatoParts1and11
查看详情
相关分类
农业/林业 畜牧/养殖 生物科学 环境科学 数学 物理学 力学 化学 天文学 测绘学 地球科学 大气科学(气象学) 地质学 海洋学
12
相关图书 / 更多
现代几何方法和应用(第3卷)
现代演化经济学
[美]理查德·R.纳尔逊 著;石俊国 陈莹 译
20.00
现代几何方法和应用(第3卷)
现代分析方法
兰州大学分析化学教研室 主编
27.14
现代几何方法和应用(第3卷)
现代水工混凝土关键技术
田育功
55.00
现代几何方法和应用(第3卷)
现代家具生产与运作管理()
熊先青 主编
25.76
现代几何方法和应用(第3卷)
现代工科实验室安全
谢晖
19.90
现代几何方法和应用(第3卷)
现代大学英语(第三版)(精读)(4)(同步测试)
国伟
22.45
现代几何方法和应用(第3卷)
现代放射治疗设备学
卢洁,李小波,巩贯忠
120.00
现代几何方法和应用(第3卷)
现代文阅读满分答题公式+120篇阅读训练 7-9年级
有道语文教研中心
43.78
现代几何方法和应用(第3卷)
现代小说化读
王鼎钧
18.00
现代几何方法和应用(第3卷)
现代汉语书面语历时语域变异研究
李佳蕾
47.40
现代几何方法和应用(第3卷)
现代护士临床必读
郭丽娟
85.14
现代几何方法和应用(第3卷)
现代合作性金融制度的产生、变迁及功能研究
杨焱
12.90
您可能感兴趣 / 更多
现代几何方法和应用(第3卷)
苏霍姆林斯基选集(五卷本)精装本 第5卷(系统了解苏霍姆林斯基教育思想的教育经典名著,教师培训用书)
B.A.苏霍姆林斯基 著;蔡汀 王义高 祖晶 主编
53.13
现代几何方法和应用(第3卷)
苏霍姆林斯基选集(五卷本)精装本 第4卷(系统了解苏霍姆林斯基教育思想的教育经典名著,教师培训用书)
B.A.苏霍姆林斯基 著;蔡汀 王义高 祖晶 主编
53.13
现代几何方法和应用(第3卷)
苏霍姆林斯基选集(五卷本)精装本 第3卷(系统了解苏霍姆林斯基教育思想的教育经典名著,教师培训用书)
B.A.苏霍姆林斯基 著;蔡汀 王义高 祖 晶 主编
59.76
现代几何方法和应用(第3卷)
给教师的建议
B.A.苏霍姆林斯基
1.00
现代几何方法和应用(第3卷)
20世纪苏联教育经典译丛:苏霍姆林斯基论劳动教育
B.A.苏霍姆林斯基 著
18.72
现代几何方法和应用(第3卷)
自然科学问题的数学分析
B.A.卓里奇
22.00
现代几何方法和应用(第3卷)
拉赫玛尼诺夫钢琴作品集·卷4:双钢琴作品(第2部分)
B.A.拉姆、李名强 编
17.50
现代几何方法和应用(第3卷)
DavidBeckham:BorntoPlay(AllAboardReading)
B.A. Roth 著
100.00
现代几何方法和应用(第3卷)
贝多芬钢琴奏鸣曲集(共两卷4册)
B.A.瓦尔勒 著
10.00
现代几何方法和应用(第3卷)
现代几何学方法和应用
B.A.Dubrovin、A.T.Fomenko、S.P.Novikov 编
32.00
现代几何方法和应用(第3卷)
现代几何方法和应用(第2卷)
B.A.Dubrovin 著
20.00
现代几何方法和应用(第3卷)
Modern Geometry - Methods and Applications:Part I: The Geometry of Surfaces, Transformation Groups, and Fields
B.A. Dubrovin;A.T. Fomenko;S.P. Novikov
691.00
© 2002-2024 Kongfz.com 孔夫子旧书网 版权所有
关于孔网 联系我们 帮助中心 版权隐私 广告业务 工作机会 移动版 图书目录 图书标签 热搜书籍 作家大全