光学相干性和量子光学,作者:(L.Mandel) E.Wolf

Prior to the development of the first lasers in the 1960s, optical coherence was not a subject with which many scientists had much acquaintance, even though early contributions to the field were made by several distinguished physicists, including Max you Lane, Erwin Schrodinger and Frits Zernike. However, the situation changed once it was realized that the remarkable properties of laser light depended on its coherence. An earlier development that also triggered interest in optical coherence was a series of important experiments by Hanbury Brown and Twiss in teh 1950s,showing that, correlations between the fluctuations of mutually coherent beams of thermal light could be measured by photoelectric correlation and two-photon coincidence counting experiments. The interpretation of these experiments was, however, surrounded by controversy, which emphasized the need for understanding the coherence properties of light and their effect on the interaction between light and matter. a[s%2>e  
Prior to the development of the first lasers in the 1960s, optical coherence was not a subject with which many scientists had much acquaintance, even though early contributions to the field were made by several distinguished physicists, including Max you Lane, Erwin Schrodinger and Frits Zernike. However, the situation changed once it was realized that the remarkable properties of laser light depended on its coherence. An earlier development that also triggered interest in optical coherence was a series of important experiments by Hanbury Brown and Twiss in teh 1950s,showing that, correlations between the fluctuations of mutually coherent beams of thermal light could be measured by photoelectric correlation and two-photon coincidence counting experiments. The interpretation of these experiments was, however, surrounded by controversy, which emphasized the need for understanding the coherence properties of light and their effect on the interaction between light and matter. ?>q=Nf^Q.  
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Preface BO[Q"g$Kon  
1 Elements of probability theory 2EE/xnwX  
　1.1 Definitions l@1f L%f  
　1.2 Properties of probabilities dG7sY O@U  
　　1.2.1 Joint probabilities i[3$Wi$  
　　1.2.2 Conditional probabilities %9mB4Fc6b)  
　　1.2.3 Bayes'theorem on inverse probabilities 0x^$q? \A  
　1.3 Random variables and probability distributions Vu`dEvL?  
　　1.3.1 Transformations ofvariates HT?`PG  
　　1.3.2 Expectations and moments b{sE#m%r  
　　1.3.3 Chebyshev inequality y#AY+ >  
　1.4 Generating functions b,T=0W  
　　1.4.1 Moment generating function >jl"Yr#  
　　1.4.2 Characteristic function ieBW 0eMi  
　　1.4.3 Cumulants (~Zg\(5#  
　1.5 Some examples of probability distributions Q
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　　1.5.1 Bernoulli or binomial distributiou Zz?+,-$_*&  
　　1.5.2 Poisson distribution m_rRe\  
　　1.5.3 Bose-Einstein distribution GU&XK7L  
　　1.5.4 The weak law of large numbers 8x,;B_Zu  
　…… fbuop&FN+q  
2 Random processes .v1rrH?  
3 Some useful mathematical techniques vo71T<K  
4 Second-order Coherence theory of scalar wavefields p6=#LwL'  
5 Radiation form sources of any state of coherence iXl1S[.l  
7 Some applications of second-order coherence theory w5n>hz_5  
8 Higher-order correlations in optical fields "6KOql3  
9 Semiclassical theory of photoelectric detection of light /u:Sn=SPd  
10 Quantization of the free electromagnetic field -m'a%aog  
11 Coherent states of the electromagnetic field HwST^\Ao  
12 Quantum correlations and photon statistics I}:>M!w  
13 Radiation from thermal equilibrium sources '3hvR
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14 Quantum theory of photoelectric detection of light 2DV{gF  
15 Interaction between light and a two-level atom gP1$#KgU  
16 Collective atomic interactions 3&' STPpW  
17 Some general techniques for treating interacting systems _%1.D0<~-E  
18 The single-mode laser +#B%YK|LR  
19 The two-mode ring laser K=(&iq!VO  
20 Squeezed states of light ,+'f unH  
22 Some quantum effects in nonlinear optics 9oq(5BG,  
References 3"L$*toRA  
Author index 7gQt k  
Subject index ~o # NOfYi  
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