| Preface |
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ix | |
| 1 Introduction |
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1.1 Hyperbolic geometry and conformal dynamics |
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2 | |
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1.2 Automorphic distributions and intertwining families |
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6 | |
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1.3 Asymptotically hyperbolic Einstein metrics. Conformally covariant powers of the Laplacian |
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9 | |
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1.4 Intertwining families |
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11 | |
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1.5 The residue method for the hemisphere |
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17 | |
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1.6 Q-curvature, holography and residue families |
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20 | |
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1.7 Factorization of residue families. Recursive relations |
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32 | |
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1.8 Families of conformally covariant differential operators |
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42 | |
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1.9 Curved translation and tractor families |
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46 | |
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1.10 Holographic duality. Extrinsic Q-curvature. Odd order Q-curvature |
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50 | |
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1.11 Review of the contents |
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55 | |
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1.12 Some further perspectives |
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58 | |
| 2 Spaces, Actions, Representations and Curvature |
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2.1 Lie groups, Lie algebras, spaces and actions |
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63 | |
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2.2 Stereographic projection |
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67 | |
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2.3 Poisson transformations and spherical principal series |
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71 | |
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81 | |
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2.5 Riemannian curvature and conformal change |
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82 | |
| 3 Conformally Covariant Powers of the Laplacian, Q-curvature and Scattering Theory |
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3.1 GJMS-operators and Q-curvature |
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87 | |
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91 | |
| 4 Paneitz Operator and Paneitz Curvature |
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4.1 P4, Q4 and their transformation properties |
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106 | |
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4.2 The fundamental identity for the Paneitz curvature |
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108 | |
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114 | |
| 5 Intertwining Families |
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117 | |
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5.1.1 Even order families D2N(λ) |
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117 | |
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5.1.2 Odd order families D2N+1 (λ) |
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127 | |
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5.1.3 DN(λ) as homomorphism of Verma modules |
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129 | |
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131 | |
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131 | |
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5.2.2 Even order families: Dnc2N(λ) and Dc2N (λ) |
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139 | |
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5.2.3 Odd order families: Dnc2N+1(λ) and Dnc2N+1(λ) |
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148 | |
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5.2.4 Eigenfunctions of ΔHn and the families DncN(λ) |
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154 | |
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5.3 Some low order examples |
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161 | |
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5.4 Families for (Rn, Sn-1) |
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165 | |
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5.4.1 The families DbN (λ) |
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165 | |
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5.4.2 Db1(λ), Db2(λ) and Db3(λ) |
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172 | |
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5.4.3 Db4(0) for n = 4 and (P3, T) for (B4, S3) |
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176 | |
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5.5 Automorphic distributions |
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178 | |
| 6 Conformally Covariant Families |
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6.1 Fundamental pairs and critical families |
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190 | |
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194 | |
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6.3 D2(g; λ) for a surface in a 3-manifold |
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195 | |
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6.4 Second-order families. General case |
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201 | |
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6.5 Families and the asymptotics of eigenfunctions |
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208 | |
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6.6 Residue families and holographic formulas for Q-curvature |
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214 | |
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6.7 D2(g; λ) as a residue family |
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235 | |
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236 | |
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6.9 The holographic coefficients upsilon2, upsilon4 and upsilon6 |
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239 | |
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6.10 The holographic formula for Q6 |
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254 | |
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6.11 Factorization identities for residue families. Recursive relations |
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264 | |
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6.12 A recursive formula for P6. Universality |
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318 | |
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6.13 Recursive formulas for Q8 and P8 |
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325 | |
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6.14 Holographic formula for conformally flat metrics |
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329 | |
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6.15 upsilon4 as a conformal index density |
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339 | |
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6.16 The holographic formula for Einstein metrics |
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343 | |
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6.17 Semi-holonomic Verma modules and their role |
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356 | |
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6.18 Zuckerman translation and DN(λ) |
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360 | |
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6.19 From Verma modules to tractors |
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381 | |
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6.20 Some elements of tractor calculus |
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388 | |
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6.21 The tractor families DTN(M, Σ; g; λ) |
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403 | |
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6.22 Some results on tractor families |
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418 | |
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6.23 J and Fialkow's fundamental forms |
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445 | |
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6.24 D2(g; λ) as a tractor family |
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450 | |
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6.25 The family DT3 (M, Σ; g; λ) |
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455 | |
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463 | |
| Bibliography |
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469 | |
| Index |
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485 | |
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