| Foreword | p. ix |
| The Genesis of the Theory of Relativity | p. 1 |
| Maxwell's theory as it was | p. 2 |
| Flashback: The optics of moving bodies | p. 4 |
| Lorentz's theory | p. 9 |
| Poincare's criticism | p. 12 |
| The Lorentz invariance | p. 15 |
| Einstein's theory | p. 20 |
| The inertia of energy | p. 26 |
| Conclusions | p. 29 |
| Short bibliography | p. 30 |
| Special Relativity: A Centenary Perspective | p. 33 |
| Introduction | p. 33 |
| Fundamentals of special relativity | p. 34 |
| Einstein's postulates and insights | p. 34 |
| Time out of joint | p. 35 |
| Spacetime and Lorentz invariance | p. 37 |
| Special relativistic dynamics | p. 39 |
| Classic tests of special relativity | p. 40 |
| The Michelson-Morley experiment | p. 40 |
| Invariance of c | p. 42 |
| Time dilation | p. 43 |
| Lorentz invariance and quantum mechanics | p. 43 |
| Consistency tests of special relativity | p. 44 |
| Special relativity and curved spacetime | p. 46 |
| Einstein's equivalence principle | p. 47 |
| Metric theories of gravity | p. 48 |
| Effective violations of local Lorentz invariance | p. 48 |
| Is gravity Lorentz invariant? | p. 51 |
| Tests of local Lorentz invariance at the centenary | p. 53 |
| Frameworks for Lorentz symmetry violations | p. 53 |
| Modern searches for Lorentz symmetry violation | p. 55 |
| Concluding remarks | p. 55 |
| References | p. 56 |
| The Geometry of Relativistic Spacetime | p. 59 |
| From Euclid's Geometry to Minkowski's Spacetime | p. 60 |
| Introduction and general survey | p. 60 |
| On the use of geometry in mathematical physics and the concept of spacetime | p. 66 |
| Geometry of description and geometry of representation | p. 66 |
| The use of geometry in more than three dimensions | p. 67 |
| Galilean spacetime as a geometry of representation of motion phenomenons | p. 68 |
| Postulates and construction of Minkowski's spacetime | p. 70 |
| The postulates and the light-cone structure of spacetime | p. 71 |
| Simultaneousness revisited | p. 75 |
| Space-ships' flight: the anniversary curve | p. 80 |
| Minkowskian (pseudo-)distance and the inverse triangular inequality: the twin "paradox" | p. 81 |
| Spatial equidistance and the "Lorentz contraction" of lengths | p. 84 |
| Lorentz transformations in the Minkowskian plane and two-dimensional Lorentz frames | p. 86 |
| The four-dimensional Minkowski's spacetime; tetrads, Lorentz group and Poincare group | p. 90 |
| Accelerated motions and curved world-lines | p. 98 |
| Curvilinear distances and the slowing down of clocks | p. 98 |
| Minkowski's description of accelerations | p. 101 |
| A comfortable trip for the "Langevin traveler" | p. 103 |
| On the visual appearance of rapidly moving objects: Lorentz contraction revisited | p. 107 |
| The Minkowskian energy-momentum space: E = mc[superscript 2] and particle physics | p. 112 |
| Toward simple geometries of curved spacetimes | p. 117 |
| References | p. 119 |
| The de Sitter and anti-de Sitter Sightseeing Tour | p. 120 |
| Introduction | p. 120 |
| An analogy: non-Euclidean spaces of constant curvature | p. 120 |
| The de Sitter universe | p. 122 |
| Anti-de Sitter | p. 126 |
| Epilogue | p. 132 |
| References | p. 133 |
| Experiments with Single Photons | p. 135 |
| Back to the beginning: Einstein's 1905 and 1909 articles | p. 135 |
| Quantum optics and the photon | p. 137 |
| Using single photons: Quantum Key Distribution | p. 139 |
| Single photon sources | p. 142 |
| Coalescing photons | p. 144 |
| "En guise de conclusion": towards entangled photons on demand | p. 147 |
| References | p. 148 |
| Einstein 1905-1955: His Approach to Physics | p. 151 |
| On Einstein's Epistemology | p. 151 |
| Einstein and Philosophy | p. 152 |
| Hume, Kant, Mach and Poincare | p. 153 |
| Scientific Philosophy and Einstein's Conceptual Innovation | p. 155 |
| Einstein and the Theories of Relativity | p. 158 |
| Einstein and the Kantian Quantum | p. 159 |
| A Crucial Conversation | p. 160 |
| "Waves Over Here, Quanta Over There!" | p. 163 |
| Einstein's "Ghost Field", Born's "Probability Amplitude", and Heisenberg's "Uncertainty Relations" | p. 164 |
| A Watershed Moment | p. 167 |
| Adventurers in Entangled Reality | p. 169 |
| The Mouse and the Universe | p. 172 |
| The Multiple World | p. 176 |
| The Kantian Quantum | p. 180 |
| References | p. 182 |
| On Boltzmann's Principle and Some Immediate Consequences Thereof: Translation by Bertrand Duplantier and Emily Parks from the original German text into French and English | p. 183 |
| Commentary | p. 194 |
| General potential | p. 194 |
| Moments of any order | p. 197 |
| Brownian Motion, "Diverse and Undulating" | p. 201 |
| A brief history of Brownian motion | p. 202 |
| Robert Brown and his precursors | p. 203 |
| The period before Einstein | p. 205 |
| William Sutherland, 1904-05 | p. 211 |
| Albert Einstein, 1905 | p. 215 |
| Marian von Smoluchowski | p. 231 |
| Louis Bachelier | p. 240 |
| Paul Langevin | p. 244 |
| Jean Perrin's experiments | p. 249 |
| Measurements by Brownian fluctuations | p. 255 |
| Micromanipulation of DNA molecules | p. 255 |
| Measurement of force by Brownian fluctuations | p. 257 |
| Theory | p. 259 |
| Potential theory and Brownian motion | p. 263 |
| Introduction | p. 263 |
| Newtonian potential | p. 264 |
| Harmonic functions and the Theorem of the Mean | p. 266 |
| The Dirichlet problem | p. 269 |
| Relation between potential theory and Brownian motion | p. 269 |
| Recurrence properties of Brownian motion | p. 275 |
| The fine geometry of the planar Brownian curve | p. 279 |
| The Brownian boundary | p. 279 |
| Potential theory in a neighborhood of a Brownian curve | p. 283 |
| Multifractality | p. 284 |
| Generalized multifractality | p. 289 |
| Table of Contents provided by Ingram. All Rights Reserved. |
