| Foreword |
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xiii | |
| Preface |
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xv | |
| Introduction |
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xvii | |
| Index of notation |
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xix | |
| Part 1: A Quick Introduction to Complex Analytic Functions |
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Chapter 1 The complex exponential function |
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3 | (12) |
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3 | (1) |
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1.2 The function exp is C-derivable |
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4 | (3) |
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1.3 The exponential function as a covering map |
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7 | (1) |
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1.4 The exponential of a matrix |
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8 | (2) |
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1.5 Application to differential equations |
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10 | (2) |
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12 | (3) |
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15 | (14) |
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15 | (5) |
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2.2 Convergent power series |
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20 | (2) |
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2.3 The ring of power series |
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22 | (1) |
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2.4 C-derivability of power series |
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23 | (2) |
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2.5 Expansion of a power series at a point not equal to 0 |
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25 | (1) |
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2.6 Power series with values in a linear space |
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26 | (1) |
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27 | (2) |
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Chapter 3 Analytic functions |
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29 | (10) |
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3.1 Analytic and holomorphic functions |
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29 | (3) |
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32 | (1) |
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33 | (3) |
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3.4 Our first differential algebras |
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36 | (1) |
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37 | (2) |
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Chapter 4 The complex logarithm |
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39 | (6) |
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4.1 Can one invert the complex exponential function? |
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39 | (1) |
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4.2 The complex logarithm via trigonometry |
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40 | (1) |
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4.3 The complex logarithm as an analytic function |
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41 | (1) |
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4.4 The logarithm of an invertible matrix |
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42 | (2) |
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44 | (1) |
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Chapter 5 From the local to the global |
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45 | (12) |
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5.1 Analytic continuation |
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45 | (2) |
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47 | (3) |
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5.3 A first look at differential equations with a singularity |
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50 | (2) |
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52 | (5) |
| Part 2: Complex Linear Differential Equations and their Monodromy |
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Chapter 6 Two basic equations and their monodromy |
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57 | (20) |
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6.1 The "characters" zalpha |
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57 | (13) |
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6.2 A new look at the complex logarithm |
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70 | (4) |
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6.3 Back again to the first example |
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74 | (1) |
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75 | (2) |
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Chapter 7 Linear complex analytic differential equations |
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77 | (26) |
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77 | (4) |
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7.2 Equations of order n and systems of rank n |
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81 | (6) |
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7.3 The existence theorem of Cauchy |
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87 | (2) |
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7.4 The sheaf of solutions |
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89 | (2) |
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7.5 The monodromy representation |
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91 | (4) |
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7.6 Holomorphic and meromorphic equivalences of systems |
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95 | (6) |
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101 | (2) |
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Chapter 8 A functorial point of view on analytic continuation: Local systems |
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103 | (14) |
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8.1 The category of differential systems on Omega |
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103 | (2) |
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8.2 The category Ls of local systems on Omega |
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105 | (2) |
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8.3 A functor from differential systems to local systems |
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107 | (2) |
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8.4 From local systems to representations of the fundamental group |
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109 | (4) |
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113 | (4) |
| Part 3: The Riemann-Hilbert Correspondence |
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Chapter 9 Regular singular points and the local Riemann-Hilbert correspondence |
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117 | (20) |
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9.1 Introduction and motivation |
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118 | (2) |
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9.2 The condition of moderate growth in sectors |
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120 | (3) |
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9.3 Moderate growth condition for solutions of a system |
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123 | (1) |
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9.4 Resolution of systems of the first kind and monodromy of regular singular systems |
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124 | (4) |
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9.5 Moderate growth condition for solutions of an equation |
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128 | (4) |
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9.6 Resolution and monodromy of regular singular equations |
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132 | (3) |
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135 | (2) |
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Chapter 10 Local Riemann-Hilbert correspondence as an equivalence of categories |
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137 | (8) |
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10.1 The category of singular regular differential systems at 0 |
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138 | (1) |
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10.2 About equivalences and isomorphisms of categories |
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139 | (2) |
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10.3 Equivalence with the category of representations of the local fundamental group |
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141 | (1) |
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10.4 Matricial representation |
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142 | (2) |
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144 | (1) |
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Chapter 11 Hypergeometric series and equations |
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145 | (16) |
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11.1 Fuchsian equations and systems |
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145 | (4) |
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11.2 The hypergeometric series |
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149 | (1) |
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11.3 The hypergeometric equation |
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150 | (3) |
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11.4 Global monodromy according to Riemann |
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153 | (4) |
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11.5 Global monodromy using Barnes' connection formulas |
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157 | (2) |
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159 | (2) |
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Chapter 12 The global Riemann-Hilbert correspondence |
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161 | (8) |
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161 | (1) |
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12.2 The twenty-first problem of Hilbert |
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162 | (4) |
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166 | (3) |
| Part 4: Differential Galois Theory |
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Chapter 13 Local differential Galois theory |
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169 | (12) |
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13.1 The differential algebra generated by the solutions |
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170 | (2) |
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13.2 The differential Galois group |
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172 | (3) |
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13.3 The Galois group as a linear algebraic group |
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175 | (4) |
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179 | (2) |
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Chapter 14 The local Schlesinger density theorem |
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181 | (12) |
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14.1 Calculation of the differential Galois group in the semi-simple case |
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182 | (4) |
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14.2 Calculation of the differential Galois group in the general case |
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186 | (2) |
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14.3 The density theorem of Schlesinger in the local setting |
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188 | (3) |
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14.4 Why is Schlesinger's theorem called a "density theorem"? |
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191 | (1) |
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192 | (1) |
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Chapter 15 The universal (fuchsian local) Galois group |
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193 | (8) |
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15.1 Some algebra, with replicas |
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194 | (2) |
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15.2 Algebraic groups and replicas of matrices |
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196 | (3) |
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199 | (1) |
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200 | (1) |
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Chapter 16 The universal group as proalgebraic hull of the fundamental group |
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201 | (18) |
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16.1 Functoriality of the representation rhoA of pi1 |
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201 | (2) |
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16.2 Essential image of this functor |
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203 | (4) |
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16.3 The structure of the semi-simple component of pi1 |
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207 | (6) |
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16.4 Rational representations of pi1 |
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213 | (1) |
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16.5 Galois correspondence and the proalgebraic hull of pi1 |
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214 | (2) |
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216 | (3) |
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Chapter 17 Beyond local fuchsian differential Galois theory |
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219 | (18) |
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17.1 The global Schlesinger density theorem |
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220 | (1) |
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17.2 Irregular equations and the Stokes phenomenon |
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221 | (5) |
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17.3 The inverse problem in differential Galois theory |
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226 | (1) |
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17.4 Galois theory of nonlinear differential equations |
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227 | (2) |
| Appendix A. Another proof of the surjectivity of exp : Matn(C)>GLn(C) |
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229 | (4) |
| Appendix B. Another construction of the logarithm of a matrix |
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233 | (4) |
| Appendix C. Jordan decomposition in a linear algebraic group |
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237 | (6) |
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C.1 Dunford-Jordan decomposition of matrices |
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237 | (4) |
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C.2 Jordan decomposition in an algebraic group |
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241 | (2) |
| Appendix D. Tannaka duality without schemes |
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243 | (12) |
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D.1 One weak form of Tannaka duality |
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245 | (1) |
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D.2 The strongest form of Tannaka duality |
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246 | (2) |
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D.3 The proalgebraic hull of Z |
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248 | (3) |
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D.4 How to use tannakian duality in differential Galois theory |
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251 | (4) |
| Appendix E. Duality for diagonalizable algebraic groups |
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255 | (4) |
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E.1 Rational functions and characters |
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255 | (2) |
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E.2 Diagonalizable groups and duality |
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257 | (2) |
| Appendix F. Revision problems |
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259 | (8) |
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259 | (1) |
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260 | (3) |
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F.3 Some more revision problems |
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263 | (4) |
| Bibliography |
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267 | (4) |
| Index |
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271 | |
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