Quantum SqueezingThe concept of squeezing is intimately related to the idea of vacuum fluctu ations, once thought to place an absolute limit to the accuracy of measure ment. However, vacuum fluctuations are not unchangeable. By recognizing that these quantum fluctuations always occur in two complementary observ ables, physicists have been able to make an intriguing trade-off. Reduced fluctuations in one variable can be realized - at the expense of increased fluctuations in another, according to Heisenberg. This Heisenberg 'horse-trade' - originally predicted by theorists - was first accomplished experimentally by R. Slusher in 1985. Since then, the var ious techniques and applications of quantum squeezing have metamorphosed into a central tool in the wider field of quantum information. This book is a summary of the main ideas, methods and applications of quantum squeezing, written by those responsible for some of the chief developments in the field. The book is divided into three parts, to recognize that there are three areas in this research. These are the fundamental physics of quantum fluc tuations, the techniques of generating squeezed radiation, and the potential applications. Part I of the book, giving the fundamentals, is arranged as follows. • Chapter 1 introduces the basic ideas about what squeezing of quantum fluctuations is from the quantized free-field perspective. This chapter es tablishes the definitions and notations used throughout. • Chapter 2 explains how to quantize radiation in a dielectric, which is the basic technique that is used to make squeezed radiation. |
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Índice
Squeezed States Basic Principles | 3 |
111 Quantization of the Electromagnetic Field | 5 |
112 Uncertainty Relations and Squeezing of Quantum Fluctuations | 6 |
113 WeylHeisenberg Algebra and Quadrature Squeezing | 7 |
12 Quantum States of Light Fields | 8 |
122 Fock States | 12 |
123 Coherent States | 13 |
124 Squeezed States | 15 |
623 InLoop and OutofLoop Spectra | 181 |
624 Commutation Relations | 184 |
625 Semiclassical Theory | 185 |
626 QND Measurements of InLoop Beams | 187 |
627 A Squeezed Input | 188 |
63 Quantum Langevin Equations | 189 |
64 Feedback Based on Nonlinear Measurements | 191 |
642 QNDBased Feedback | 193 |
125 TwoMode Squeezed Vacuum | 19 |
Quantum Interference in Phase Space | 21 |
14 Superpositions of Coherent States | 26 |
15 Onedimensional Continuous Superpositions of Coherent States | 29 |
16 Conclusion | 30 |
Nonlinear Dielectrics | 33 |
21 Macroscopic Approach | 34 |
211 Vector Potential Quantization | 35 |
212 Dual Potential Quantization | 36 |
22 Mode Expansion | 38 |
23 Dispersion | 39 |
24 Microscopic Approach | 44 |
25 Conclusion | 50 |
InputOutput Theory | 53 |
31 Free Fields | 55 |
32 Harmonic Oscillator Coupled to a Transmission Line | 57 |
33 Field Theoretic Approach to InputOutput Theory | 61 |
34 Approximations | 63 |
35 Alternative Approach to InputOutput Theory | 67 |
36 Scattering Matrices Within the Markov Approximation | 72 |
37 Reflection Parametric Amplifier | 73 |
38 Homodyne Detection | 74 |
39 Multiple Ports | 80 |
310 Phase Shifters | 82 |
311 Beam Splitters | 83 |
312 Resonators | 85 |
313 Lossy Transmission Lines | 88 |
314 Attenuators | 94 |
References | 95 |
Generation of Quantum Squeezing | 97 |
Squeezing with Nonlinear Optics | 99 |
41 Transient Squeezing | 100 |
42 Driven Parametric Oscillator | 102 |
43 Observable Moments and Spectra | 105 |
44 Heisenberg and Classical Equations | 107 |
45 FokkerPlanck and Stochastic Equations | 112 |
46 BelowThreshold Perturbation Theory | 115 |
461 Matched Power Equations | 116 |
462 External Squeezing Correlations | 118 |
463 Optimal Squeezing | 119 |
464 Experiments | 122 |
47 Waveguides and Fibers | 123 |
472 Nonlinear Schrodinger Equation | 125 |
473 Parametric Operator Equations | 127 |
474 Squeezed Propagation | 128 |
475 Quadrature Variances | 130 |
476 Photon Number Correlations | 131 |
481 RamanSchrodinger Model | 132 |
482 Initial Conditions and Quantum Evolution | 133 |
484 Experiments | 135 |
49 Conclusion | 136 |
References | 137 |
Squeezing from Lasers | 141 |
51 The Laser Model | 142 |
511 The Hamiltonian | 144 |
512 The Quantum Langevin Equation | 145 |
513 Laser Rate Equations | 147 |
514 Linearized Fluctuation Equations | 149 |
515 Noise Spectra | 151 |
516 Phenomenological SemiClassical Equations | 152 |
52 Squeezing from the Rate Equation Model | 153 |
522 Regularized Pumping | 154 |
524 Inversion Filtering | 157 |
525 Squeezing Efficiency | 158 |
526 Squeezing Under NonIdeal Conditions | 160 |
53 Squeezing from Coherent Effects | 161 |
531 Extending the Laser Model | 163 |
532 Squeezing from Coherent Pumping | 165 |
54 Conclusion | 166 |
55 Expectation Values | 167 |
56 SemiClassical Solutions | 168 |
References | 169 |
Squeezing and Feedback | 171 |
61 Continuum Fields | 173 |
612 Photodetection | 176 |
62 InLoop Squeezing | 178 |
622 Stability | 180 |
643 Parametric Down Conversion | 195 |
644 Second Harmonic Generation | 196 |
65 Quantum Trajectories | 197 |
652 Photon Counting | 199 |
653 Homodyne Detection Theory | 201 |
654 HomodyneMediated Feedback | 202 |
66 Intracavity Squeezing | 203 |
662 HomodyneMediated Feedback | 205 |
663 QNDMediated Feedback | 208 |
664 Mimicking a Squeezed Bath | 210 |
665 The Micromaser | 211 |
68 InLoop Squeezing Revisited | 212 |
682 An InLoop Atom | 215 |
683 Comparison with Free Squeezing | 217 |
684 Other Uses of Squashed Light | 219 |
69 Conclusion | 220 |
References | 222 |
Applications of Quantum Squeezing | 225 |
Communication and Measurement with Squeezed States | 227 |
71 Classical Communication and Measurement | 229 |
712 Signal Noise and Dimensionality | 232 |
713 Communication versus Measurement | 236 |
72 Quantum Communication | 237 |
722 Mutual Information | 239 |
723 The Entropy Bound | 242 |
724 Effect of Loss | 243 |
725 Quantum Amplifiers and Duplicators | 244 |
73 Ultimate Limit on Measurement Accuracy | 248 |
732 Classical RateDistortion Limit | 251 |
733 Ultimate Quantum Measurement System Limit | 253 |
74 Position Monitoring with Contractive States | 255 |
References | 258 |
Novel Spectroscopy with TwoLevel Atoms in Squeezed Fields | 263 |
81 Theoretical Description of the Interaction of Squeezed Light with a TwoLevel Atom | 266 |
82 The TwoLevel Atom in Free Space | 268 |
822 The Dipole Decay Rates | 269 |
823 Resonance Fluorescence | 270 |
824 Anomalous Resonance Fluorescence | 273 |
825 Pure Atomic States | 277 |
826 Optimum Squeezing in the Output Field | 280 |
827 Amplification of a Weak Probe Beam | 282 |
828 Arbitrary Intensity Probe | 285 |
829 Dressed State Population Trapping | 286 |
83 TwoLevel Atoms in the Cavity Environment | 290 |
831 The Mean Photon Number | 291 |
832 The Bad Cavity Limit | 292 |
833 The FabryPerot Microcavity | 293 |
834 Bichromatic Excitation | 295 |
84 Finite Bandwidth Sources | 297 |
85 Systems of Na TwoLevel Atoms | 300 |
852 Effect of Finite Separations | 301 |
853 Two NonIdentical Atoms | 304 |
References | 305 |
Spectroscopy with ThreeLevel Atoms in a Squeezed Field | 311 |
Master Equation | 313 |
92 Equations of Motion for the Density Matrix Elements | 320 |
93 Spontaneous Emission in a Squeezed Vacuum | 322 |
94 Stationary Lineshape in a Squeezed Vacuum | 329 |
95 Quantum Interference with Squeezed Light | 330 |
96 Conclusion | 333 |
EinsteinPodolskyRosen Correlations Entanglement and Quantum Cryptography | 337 |
101 Generalization of the EPR Argument to Give Criteria for EPR Correlations | 339 |
1011 Generalized EPR Argument | 340 |
1012 1989 Inferred Heisenberg Uncertainty EPR Criterion | 342 |
102 EPR Correlations from TwoMode Squeezed Light | 344 |
103 Generalized EPR Criteria | 346 |
104 Generalized EPR Correlations and Entanglement | 349 |
1041 1989 EPR Criterion as a Signature of Entanglement | 350 |
1042 A Signature of Entanglement Defined Through Observation of TwoMode Squeezing | 351 |
1043 Generalized EPR Correlations Deduced Through Demonstrations of Entanglement | 353 |
1044 Relationship to Stronger Entanglement Criteria Based on BellType Inequalities | 356 |
1045 Entanglement is Implied Through Demonstrations of EPR Correlations | 357 |
105 Application of EPR TwoMode Squeezed States to Quantum Cryptography | 358 |
References | 362 |
Bibliography | 365 |
| 367 | |
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Referencias a este libro
Fundamentals of Quantum Optics and Quantum Information Peter Lambropoulos,David Petrosyan Vista previa restringida - 2006 |
Información bibliográfica
| Título | Quantum Squeezing Physics and Astronomy Online Library Volumen 27 de Springer Series on Atomic, Optical, and Plasma Physics, ISSN 1615-5653 Springer series on atoms + plasmas |
| Editores | Peter D. Drummond, Zbigniew Ficek |
| Edición | ilustrada |
| Editor | Springer Science & Business Media, 2004 |
| ISBN | 3540659897, 9783540659891 |
| N.º de páginas | 370 páginas |
| Exportar cita | BiBTeX EndNote RefMan |