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Book Categories |
| Pt. I | Survey | |
| Survey | 2 | |
| Pt. II | The classification where G is a complex Lie group | |
| Preparations | 22 | |
| The case G complex solvable | 28 | |
| The case G semisimple, complex | 38 | |
| The mixed case: Line bundles and dim[subscript C](S) > 3 | 51 | |
| The mixed case with [actual symbol not reproducible] and R abelian | 58 | |
| The mixed case with [actual symbol not reproducible] and R non-abelian | 70 | |
| Pt. III | The classification where G is a real Lie group | |
| Preparations | 87 | |
| Holomorphic fibre bundles | 97 | |
| G solvable | 104 | |
| Classification for G solvable and dim[subscript R](G) = 6 | 112 | |
| The case G solvable and dim[subscript R](G) > 6 | 131 | |
| The non-solvable case with R transitive | 148 | |
| The case dim[subscript C](G/RH) = 1 | 162 | |
| Holomorphic fibrations in the case dim[subscript R](S) > 3 | 190 | |
| S-orbits in homogeneous-rational manifolds | 207 | |
| References | 225 | |
| Subject Index | 229 |
| Price | Condition | Delivery | Seller | Action |
| $99.99 | Digital |
| WonderClub |
Elesvan Flores
reviewed The Classification of Three-dimensional Homogeneous Complex Manifolds on November 01, 2020
The Classification of Three-dimensional Homogeneous Complex Manifolds
The "spade" suit is appropriate on the spine of volume 1. This book is a lot of work, as it lays the mathematical foundations for volumes 2, 3, and 4. It is made more enjoyable by the elaborate word-play and droll hand-drawn illustrations. I think the authors had a lot of fun writing this book.
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Add The Classification of Three-dimensional Homogeneous Complex Manifolds, This book provides a classification of all three-dimensional complex manifolds for which there exists a transitive action (by biholomorphic transformations) of a real Lie group. This means two homogeneous complex manifolds are considered equivalent if the, The Classification of Three-dimensional Homogeneous Complex Manifolds to the inventory that you are selling on WonderClubX
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Add The Classification of Three-dimensional Homogeneous Complex Manifolds, This book provides a classification of all three-dimensional complex manifolds for which there exists a transitive action (by biholomorphic transformations) of a real Lie group. This means two homogeneous complex manifolds are considered equivalent if the, The Classification of Three-dimensional Homogeneous Complex Manifolds to your collection on WonderClub |