| Preface |
|
ix | |
| Acknowledgments |
|
xi | |
| Introduction |
|
xiii | |
|
Colombeau's Theory of Generalized Functions |
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|
1 | (100) |
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Multiplication of Distributions |
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|
1 | (7) |
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8 | (46) |
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Definition and Basic Properties |
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8 | (8) |
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16 | (9) |
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Tempered Generalized Functions |
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25 | (6) |
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Point Values and Generalized Numbers |
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31 | (12) |
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43 | (4) |
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Association and Coupled Calculus |
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47 | (7) |
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A General Scheme of Construction |
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54 | (3) |
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The Full Colombeau Algebra |
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57 | (23) |
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Construction of the Algebra |
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58 | (8) |
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Point Values, Integration, Association |
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66 | (4) |
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70 | (10) |
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Applications to Differential Equations |
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80 | (14) |
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Existence and Uniqueness of Solutions |
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80 | (8) |
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Delta Function Potentials in Classical Mechanics |
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88 | (6) |
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Colombeau's Original Approach |
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94 | (7) |
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Diffeomorphism Invariant Colombeau Theory |
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|
101 | (118) |
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101 | (6) |
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107 | (9) |
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Calculus on Convenient Vector Spaces |
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107 | (6) |
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113 | (3) |
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116 | (16) |
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116 | (1) |
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117 | (8) |
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125 | (7) |
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Definitions and Basic Theorems |
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132 | (6) |
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Characterization Results I |
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138 | (13) |
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139 | (4) |
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Characterization Theorems I |
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143 | (8) |
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Stability under Differentiation |
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151 | (1) |
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Characterization Results II |
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152 | (16) |
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154 | (4) |
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Characterization Theorems II |
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158 | (10) |
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Diffeomorphism Invariance and Gd (Ω) |
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168 | (9) |
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|
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177 | (2) |
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Separating the Basic Definition from Testing |
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179 | (2) |
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181 | (2) |
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Non-Injectivity of the Canonical Homomorphism from Gd(Ω) into Ge(Ω) |
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183 | (13) |
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Classification of Smooth Colombeau Algebras between Gd(Ω) and Ge(Ω) |
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196 | (10) |
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The Development from Ge(Ω) to Gd(Ω) |
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196 | (2) |
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Classification of Test Objects |
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198 | (2) |
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Classification of Full Smooth Colombeau Algebras |
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200 | (6) |
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The Algebra G2; Classification Results |
|
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206 | (11) |
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217 | (2) |
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Generalized Functions on Manifolds |
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219 | (134) |
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Distributions on Manifolds |
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220 | (57) |
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220 | (2) |
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Densities, Integration, Orientation |
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222 | (7) |
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Test Fields and Distributions |
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229 | (4) |
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Local Description and Global Structure |
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233 | (10) |
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Orientable Manifolds, Distributional Geometry |
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243 | (34) |
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The Special Algebra on Manifolds |
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277 | (55) |
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Basic Properties, Point Value Characterization |
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277 | (6) |
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Embeddings and Association |
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283 | (6) |
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Generalized Sections of Vector Bundles |
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289 | (14) |
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Generalized Functions Valued in a Manifold |
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303 | (21) |
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Generalized Pseudo-Riemannian Geometry |
|
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324 | (8) |
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The Full Algebra on Manifolds |
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332 | (21) |
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332 | (3) |
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Smoothing Kernels and Basic Function Spaces |
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335 | (8) |
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Construction of the Algebra, Localization |
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343 | (5) |
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Embedding of Distributions and Smooth Functions |
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348 | (5) |
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Applications to Lie Group Analysis of Differential Equations |
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353 | (62) |
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353 | (16) |
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Lie Transformation Groups |
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354 | (4) |
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Symmetries of Differential Equations |
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358 | (6) |
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Calculation of Symmetry Groups |
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364 | (5) |
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Transfer of Classical Symmetry Groups |
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369 | (21) |
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370 | (14) |
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384 | (1) |
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Associated and Distributional Symmetries |
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385 | (5) |
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Generalized Group Actions |
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390 | (9) |
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Generalized Transformation Groups |
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390 | (3) |
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Generalized Symmetries of Differential Equations |
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393 | (6) |
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399 | (9) |
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Group Invariant Generalized Functions |
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408 | (7) |
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Applications to General Relativity |
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415 | (58) |
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415 | (4) |
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Linear and Nonlinear Distributional Geometry in General Relativity |
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419 | (13) |
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Distributional Description of Impulsive Gravitational Waves |
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432 | (41) |
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432 | (7) |
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The Geodesic Equation for Impusive pp-Waves |
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439 | (11) |
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Geodesic Deviation for Impulsive pp-Waves |
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|
450 | (12) |
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Distributional vs. Continuous Form of the Metric |
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|
462 | (11) |
| Appendices |
|
473 | (29) |
|
The Chain Rule for Higher Differentials |
|
|
473 | (6) |
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479 | (17) |
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496 | (3) |
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|
499 | (3) |
| Index |
|
502 | |
