| Preface |
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1 Dimension of a Local Ring |
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1 | (18) |
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1 | (1) |
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2 | (2) |
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4 | (2) |
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1.4 Modules of finite length |
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6 | (2) |
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1.5 Hilbert's basis theorem |
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8 | (1) |
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9 | (2) |
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11 | (2) |
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13 | (4) |
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17 | (2) |
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2 Modules over a Local Ring |
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19 | (24) |
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19 | (1) |
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2.2 Associated prime ideals |
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20 | (2) |
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2.3 Dimension of a module |
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22 | (2) |
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24 | (1) |
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2.5 Cohen-Macaulay modules |
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25 | (2) |
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2.6 Modules of finite projective dimension |
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27 | (2) |
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29 | (2) |
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31 | (1) |
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2.9 Projective dimension and depth |
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32 | (2) |
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34 | (2) |
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2.11 The acyclicity theorem |
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36 | (3) |
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39 | (4) |
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43 | (14) |
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3.1 Discrete valuation rings |
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43 | (1) |
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44 | (2) |
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46 | (1) |
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47 | (1) |
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48 | (1) |
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3.6 The first Chern class |
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49 | (2) |
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51 | (1) |
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51 | (3) |
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54 | (3) |
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57 | (8) |
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4.1 Exactness of the completion functor |
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57 | (2) |
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4.2 Separation of the J-adic topology |
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59 | (1) |
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4.3 Complete filtered rings |
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60 | (1) |
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4.4 Completion of local rings |
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61 | (2) |
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4.5 Structure of complete local rings |
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63 | (2) |
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65 | (16) |
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65 | (2) |
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67 | (1) |
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5.3 Decomposition of injective modules |
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68 | (2) |
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70 | (3) |
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5.5 Minimal injective resolutions |
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73 | (1) |
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5.6 Modules of finite injective dimension |
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74 | (3) |
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77 | (4) |
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81 | (8) |
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81 | (3) |
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6.2 Local cohomology and dimension |
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84 | (1) |
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6.3 Local cohomology and depth |
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84 | (1) |
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6.4 Support in the maximal ideal |
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85 | (2) |
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6.5 Local duality for Gorenstein rings |
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87 | (2) |
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89 | (20) |
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7.1 Complexes of injective modules |
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89 | (4) |
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7.2 Complexes with finitely generated cohomology |
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93 | (3) |
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96 | (2) |
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7.4 Existence of dualizing complexes |
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98 | (2) |
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7.5 The codimension function |
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100 | (2) |
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7.6 Complexes of flat modules |
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102 | (3) |
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7.7 Generalized evaluation maps |
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105 | (2) |
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7.8 Uniqueness of dualizing complexes |
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107 | (2) |
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109 | (20) |
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109 | (4) |
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8.2 Grothendieck's local duality theorem |
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113 | (4) |
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8.3 Duality for Cohen--Macaulay modules |
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117 | (2) |
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119 | (2) |
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8.5 Locally factorial domains |
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121 | (1) |
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122 | (3) |
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125 | (4) |
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9 Amplitude and Dimension |
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129 | (32) |
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130 | (6) |
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136 | (1) |
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9.3 The amplitude formula |
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137 | (2) |
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9.4 Dimension of a complex |
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139 | (3) |
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9.5 The tensor product formula |
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142 | (2) |
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144 | (4) |
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9.7 Condition Sr of Serre |
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148 | (4) |
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9.8 Factorial rings and condition Sr |
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152 | (3) |
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155 | (3) |
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9.10 Specialization of Poincare series |
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158 | (3) |
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10 Intersection Multiplicities |
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161 | (28) |
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10.1 Introduction to Serre's conjectures |
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161 | (2) |
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10.2 Filtration of the Koszul complex |
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163 | (4) |
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10.3 Euler characteristic of the Koszul complex |
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167 | (3) |
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10.4 A projection formula |
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170 | (1) |
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10.5 Power series over a field |
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171 | (4) |
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10.6 Power series over a discrete valuation ring |
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175 | (3) |
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10.7 Application of Cohen's structure theorem |
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178 | (3) |
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10.8 The amplitude inequality |
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181 | (1) |
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10.9 Translation invariant operators |
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182 | (2) |
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184 | (3) |
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10.11 Serre's conjecture in the graded case |
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187 | (2) |
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11 Complexes of Free Modules |
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189 | (18) |
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189 | (2) |
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11.2 The rank of a linear map |
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191 | (3) |
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11.3 The Eisenbud-Buchsbaum criterion |
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194 | (2) |
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196 | (3) |
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11.5 The Euler characteristic |
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199 | (4) |
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203 | (2) |
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11.7 The integral character of McRae's invariant |
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205 | (2) |
| Bibliography |
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207 | (4) |
| Index |
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211 | |
