| 1 Preliminaries |
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1 | (13) |
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1.1 Artinian and noetherian modules |
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2 | (2) |
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1.2 Free modules, projective modules, and injective modules |
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4 | (4) |
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1.3 Hereditary and semihereditary rings |
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8 | (2) |
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1.4 Generalizations of injectivity |
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10 | (4) |
| 2 Rings characterized by their proper factor rings |
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14 | (14) |
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2.1 Restricted artinian rings |
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14 | (2) |
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2.2 Restricted perfect rings |
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16 | (3) |
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2.3 Restricted von Neumann regular rings |
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19 | (3) |
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2.4 Restricted self-injective rings |
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22 | (6) |
| 3 Rings each of whose proper cyclic modules has a chain condition |
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28 | (9) |
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3.1 Rings each of whose proper cyclic modules is artinian |
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28 | (2) |
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3.2 Rings with restricted minimum condition |
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30 | (4) |
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3.3 Rings each of whose proper cyclic modules is perfect |
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34 | (3) |
| 4 Rings each of whose cyclic modules is injective (or CS) |
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37 | (8) |
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4.1 Rings where each cyclic module is injective |
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37 | (2) |
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4.2 Rings each of whose cyclic modules is CS |
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39 | (6) |
| 5 Rings each of whose proper cyclic modules is injective |
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45 | (4) |
| 6 Rings each of whose simple modules is injective (or Σ-injective) |
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49 | (16) |
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49 | (2) |
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51 | (4) |
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55 | (8) |
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63 | (2) |
| 7 Rings each of whose (proper) cyclic modules is quasi-injective |
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65 | (6) |
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7.1 Rings each of whose cyclic modules is quasi-injective |
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65 | (1) |
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7.2 Rings each of whose proper cyclic modules is quasi-injective |
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66 | (5) |
| 8 Rings each of whose (proper) cyclic modules is continuous |
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71 | (4) |
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8.1 Rings each of whose cyclic modules is continuous |
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71 | (1) |
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8.2 Rings each of whose proper cyclic modules is continuous |
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72 | (3) |
| 9 Rings each of whose (proper) cyclic modules is π-injective |
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75 | (9) |
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9.1 Rings each of whose cyclic modules is π-injective |
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75 | (4) |
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9.2 Rings each of whose proper cyclic modules is π-injective |
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79 | (5) |
| 10 Rings with cyclics N0-injective, weakly injective, or quasi-projective |
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84 | (10) |
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10.1 Rings each of whose cyclic modules is N0-injective |
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84 | (4) |
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10.2 Rings each of whose cyclic modules is weakly injective |
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88 | (2) |
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10.3 Rings each of whose cyclic modules is quasi-projective |
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90 | (4) |
| 11 Hypercyclic, q-hypercyclic, and π-hypercyclic rings |
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94 | (19) |
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94 | (12) |
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106 | (4) |
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110 | (3) |
| 12 Cyclic modules essentially embeddable in free modules |
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113 | (11) |
| 13 Serial and distributive modules |
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124 | (7) |
| 14 Rings characterized by decompositions of their cyclic modules |
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131 | (16) |
| 15 Rings each of whose modules is a direct sum of cyclic modules |
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147 | (4) |
| 16 Rings each of whose modules is an I0-module |
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151 | (10) |
| 17 Completely integrally closed modules and rings |
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161 | (12) |
| 18 Rings each of whose cyclic modules is completely integrally closed |
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173 | (12) |
| 19 Rings characterized by their one-sided ideals |
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185 | (22) |
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19.1 Rings each of whose one-sided ideals is quasi-injective |
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185 | (5) |
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19.2 Rings each of whose one-sided ideals is a direct sum of quasi-injectives |
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190 | (10) |
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19.3 Rings each of whose one-sided ideals is π-injective |
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200 | (1) |
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19.4 Rings each of whose one-sided ideals is a direct sum of π-injective right ideals |
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200 | (2) |
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19.5 Rings each of whose one-sided ideals is weakly injective |
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202 | (2) |
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19.6 Rings each of whose one-sided ideals is quasi-projective |
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204 | (3) |
| References |
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207 | (12) |
| Index |
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219 | |
Rohkem infot Oxford Scholarship Online e-raamatute kohta