| Introduction |
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ix | |
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Chapter 1 (Bounded) cohomology of groups |
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1 | (8) |
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1 | (2) |
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1.2 The topological interpretation of group cohomology |
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3 | (1) |
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1.3 Bounded cohomology of groups |
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3 | (2) |
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1.4 The comparison map and exact bounded cohomology |
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5 | (1) |
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5 | (1) |
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1.6 Topology and bounded cohomology |
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6 | (1) |
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6 | (3) |
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Chapter 2 (Bounded) cohomology of groups in low degree |
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9 | (14) |
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2.1 (Bounded) group cohomology in degree zero and one |
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9 | (1) |
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2.2 Group cohomology in degree two |
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9 | (3) |
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2.3 Bounded group cohomology in degree two: quasimorphisms |
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12 | (1) |
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2.4 Homogeneous quasimorphisms |
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13 | (1) |
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2.5 Quasimorphisms on abelian groups |
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14 | (1) |
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2.6 The bounded cohomology of free groups in degree 2 |
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15 | (1) |
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2.7 Homogeneous 2-cocycles |
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16 | (2) |
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2.8 The image of the comparison map |
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18 | (2) |
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20 | (3) |
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23 | (10) |
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3.1 Abelian groups are amenable |
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25 | (1) |
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3.2 Other amenable groups |
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26 | (1) |
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3.3 Amenability and bounded cohomology |
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27 | (1) |
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3.4 Johnson's characterization of amenability |
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28 | (1) |
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3.5 A characterization of finite groups via bounded cohomology |
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29 | (1) |
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30 | (3) |
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Chapter 4 (Bounded) group cohomology via resolutions |
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33 | (20) |
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33 | (2) |
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4.2 Resolutions of F-modules |
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35 | (3) |
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4.3 The classical approach to group cohomology via resolutions |
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38 | (1) |
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4.4 The topological interpretation of group cohomology revisited |
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39 | (1) |
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4.5 Bounded cohomology via resolutions |
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40 | (1) |
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4.6 Relatively injective normed r-modules |
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41 | (1) |
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4.7 Resolutions of normed Γ-modules |
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41 | (3) |
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44 | (1) |
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45 | (3) |
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4.10 Alternating cochains |
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48 | (1) |
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49 | (4) |
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Chapter 5 Bounded cohoniology of topological spaces |
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53 | (12) |
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5.1 Basic properties of bounded cohoniology of spaces |
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53 | (1) |
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5.2 Bounded singular cochains as relatively injective modules |
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54 | (2) |
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56 | (1) |
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5.4 Ivanov's contracting homotopy |
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56 | (2) |
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58 | (1) |
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59 | (1) |
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5.7 Relative bounded cohoniology |
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60 | (2) |
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62 | (3) |
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Chapter 6 L1-homology and duality |
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65 | (12) |
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6.1 Normed chain complexes and their topological duals |
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65 | (1) |
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6.2 L1-homology of groups and spaces |
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66 | (1) |
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6.3 Duality: first results |
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67 | (1) |
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6.4 Some results by Matsumoto and Morita |
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68 | (2) |
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6.5 Injectivity of the comparison map |
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70 | (1) |
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6.6 The translation principle |
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71 | (2) |
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6.7 Gromov equivalence theorem |
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73 | (2) |
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75 | (2) |
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Chapter 7 Simplicial volume |
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77 | (10) |
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7.1 The case with non-empty boundary |
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77 | (1) |
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7.2 Elementary properties of the simplicial volume |
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78 | (1) |
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7.3 The simplicial volume of Riemannian manifolds |
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79 | (1) |
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7.4 Simplicial volume of gluings |
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80 | (2) |
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7.5 Simplicial volume and duality |
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82 | (1) |
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7.6 The simplicial volume of products |
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83 | (1) |
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7.7 Fiber bundles with amenable fibers |
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83 | (1) |
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84 | (3) |
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Chapter 8 The proportionality principle |
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87 | (18) |
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8.1 Continuous cohoniology of topological spaces |
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87 | (1) |
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8.2 Continuous cochains as relatively injective modules |
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88 | (2) |
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8.3 Continuous cochains as strong resolutions of R |
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90 | (2) |
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8.4 Straightening in non-positive curvature |
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92 | (1) |
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8.5 Continuous cohoniology versus singular cohoniology |
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92 | (1) |
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93 | (2) |
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8.7 Straightening and the volume form |
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95 | (2) |
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8.8 Proof of the proportionality principle |
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97 | (1) |
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8.9 The simplicial volume of hyperbolic manifolds |
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97 | (1) |
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8.10 Hyperbolic straight simplices |
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98 | (1) |
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8.11 The seminorm of the volume form |
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99 | (1) |
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8.12 The case of surfaces |
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100 | (1) |
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8.13 The simplicial volume of negatively curved manifolds |
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100 | (1) |
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8.14 The simplicial volume of flat manifolds |
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101 | (1) |
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101 | (4) |
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Chapter 9 Additivity of the simplicial volume |
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105 | (8) |
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9.1 A cohomological proof of subadditivity |
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105 | (2) |
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9.2 A cohomological proof of Gromov additivity theorem |
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107 | (3) |
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110 | (3) |
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Chapter 10 Group actions on the circle |
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113 | (18) |
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10.1 Homeomorphisms of the circle and the Euler class |
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113 | (1) |
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10.2 The bounded Euler class |
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114 | (1) |
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10.3 The (bounded) Euler class of a representation |
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115 | (1) |
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10.4 The rotation number of a homeomorphism |
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116 | (3) |
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10.5 Increasing degree one map of the circle |
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119 | (1) |
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120 | (2) |
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122 | (4) |
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10.8 The canonical real bounded Euler cocycle |
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126 | (3) |
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129 | (2) |
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Chapter 11 The Euler class of sphere bundles |
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131 | (14) |
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11.1 Topological, smooth and linear sphere bundles |
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131 | (2) |
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11.2 The Euler class of a sphere bundle |
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133 | (3) |
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11.3 Classical properties of the Euler class |
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136 | (2) |
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11.4 The Euler class of oriented vector bundles |
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138 | (2) |
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11.5 The euler class of circle bundles |
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140 | (2) |
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11.6 Circle bundles Over surfaces |
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142 | (1) |
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143 | (2) |
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Chapter 12 Milnor-Wood inequalities and maximal representations |
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145 | (24) |
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145 | (4) |
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12.2 The bounded Euler class of a flat circle bundle |
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149 | (2) |
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12.3 Milnor-Wood inequalities |
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151 | (3) |
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12.4 Flat circle bundles on surfaces with boundary |
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154 | (8) |
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12.5 Maximal representations |
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162 | (4) |
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166 | (3) |
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Chapter 13 The bounded Euler class in higher dimensions and the Chern conjecture |
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169 | (12) |
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13.1 Ivanov-Turaev cocycle |
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169 | (4) |
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13.2 Representing cycles via simplicial cycles |
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173 | (1) |
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13.3 The bounded Euler class of a flat linear sphere bundle |
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174 | (4) |
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13.4 The Chern conjecture |
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178 | (1) |
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179 | (2) |
| Index |
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181 | (4) |
| List of Symbols |
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185 | (2) |
| Bibliography |
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187 | |
