Incidentally, only the spin of the deuteron as a whole is essential. The qualitative effect is independent of the spin of the incident particle (the M (▲, s) operator does not act on spin quantum numbers.) All the other spin effects are presumably not important. (iii) Calculations such as the one above, as well as more sophisticated calculations, have always produced cross sections in excellent agreement with experiment. (We are not considering here backward scattering, where the above model does not apply (see also [48])). There is only one exception: the experiment performed at CERN by Bradamante et al. [20]. In this experiment the discrepancy with theory occurs at a fairly large momentum transfer (42≈2 GeV2). What is the cause? Perhaps some relativistic effects? There is no good answer, so far. Without going into any explanation of this discrepancy, let us emphasize the following point: It is important to realize that when we use the same internal wave function in the initial and final states, we exclude, by doing this, any possible relativistic deformations of the recoiling target (we are still discussing only elastic processes). For large momentum transfers (A2/M2~1) this is probably not a good approximation. Take the deuteron example. In the standard Glauber model, it is enough to have p(s) = √∞ dzó。* (s, z) Þo (s, z) to compute the cross section. Suppose there is some deformation in the final state: Po* (s, 2)→o'* (A, s, z) (one can assume that the deformation is defined by the momentum transfer A). Then we should replace The interesting fact is that in exactly the same form one can write the Delbrück amplitude Delbrück (A) ~ ƒ d2b exp (i▲·b)I1 (A, s) {1— exp [ix. ̄(b−1⁄28) +ix.+(b+1⁄2s) ]} where x. are the Coulomb phase shifts of the electron-positron pair and I (A, s) is constructed from the "relativistic wave functions" in an analogous way to that shown above in the case of the deuteron. Here the possibility of a well-defined procedure of introducing relativistic deformations occurs-modeled on QED! These and other related problems have been discussed in a series of papers by Cheng and Wu [21, 22] (see also [30], [S4]). 4. Diffractive Dissociation and Diffractive Excitation Diffractive processes-a brief characterization. (i) they do not vanish in the limit E→ ∞ (ii) the target plays a passive role (except in double diffraction, but in any case: no quantum numbers are exchanged). Examples: in QED; elastic electron (positron) scattering from a Coulomb field, Delbrück scattering, Compton scattering, etc. in hadron physics; all kinds of elastic hadron-hadron scattering The nucleon and nuclear targets supplement each other because the nuclear medium amplifies the scattering of the produced objects. The model of diffractive processes described below is based on: M. L. Good and W. D. Walker (1960) [23]. The article which discusses some very early papers on the subject is: E. L. Feinberg and I. Pomerančuk (1956) [24]. For more recent discussions of many experimental and theoretical aspects of diffractive processes in hadron physics see refs. [S4] and the article by A. Bialas in [25]. We shall describe diffractive production processes in very close analogy to diffractive dissociation phenomena which are well known in the case of systems where degeneracy exists. Let us start with an example taken from optics. Consider the absorption of polarized light by an anisotropic absorber. The incident wave is polarized in the direction n (perpendicular to the z direction). n = (nz, ny) ¥2 = n2 ¥ z + ny where is the wave polarized in the x direction and V, is the wave polarized in the y direction. Suppose the target is a Nicol prism oriented in such a way that it stops all light polarized in the y direction. Hence, the only component which goes through is n,,. But it can be decomposed into n and nXe, components. Hence due to the process of absorption, a new object is created: the wave which is polarized in the direction n Xe.. Let us compute the elastic and inelastic scattering amplitudes. Since the transmitted wave is =n, the wave which goes into scattering and production is The "undisturbed" wave is Y, everywhere, hence the scattered wave is Actually it is more important for our purposes to introduce partial absorption (in general different for the two components (x, y)). This formula shows that we always produce inelastic scattering, except in two cases: (i) when the incident wave is polarized either along the x or y axis (hence either n2 = 0 or n1 =0) (ii) when the absorption coefficients are equal (the absorber is isotropic). We shall extend this description to diffractive production processes of hadronic systems. We consider the incident hadron to be a superposition of some states which get eaten up at different rates during the passage through the target; the new combination emerging from the collision then contains, in general, a new particle (or a collection of new particles). First we introduce the physical states of the system, | X;) (which are analogous to the states „ and nye, of the photon). We want to compute (X; | TX;). We expand | X;) into a set of states |A) whose scattering and absorption in the target we assume known: | {;)= Σdij | λ;) | Xi) = Σcij | X;) 2 So, The states) are assumed to be eigenstates of T in the following sense: We have obtained the result completely analogous to the one obtained for the optical diffractive production: for ij the production amplitude is proportional to the difference in absorptions of the i, j components. This is a very general property. All specific models of diffractive production processes I know of exhibit this property. Otherwise the formula is so general that it has virtually no predictive power.3 The difficulty in applying it to any realistic process is the determination of absorption parameters because the states | A) are not observed in scattering experiments. (The process of K-K‚° regeneration given below is an example where we know n's however!) The situation changes when One must, however, keep in mind that in the case when the coefficients di; are zero or of the same order of magnitude one does predict some characteristics of production processes from the knowledge of elastic scattering. Compare the end of this section. we accept that diffractive production processes are weak compared to elastic scattering. This may mean that the transformation from | X;) to | A;) differs little from unity: Hence the absorption parameters n; are determined by elastic scattering of real particles. The inelastic amplitude (X; | T | X;) = (1 — ni) ei; — (1 — nj) E ij (4.4) is proportional to the difference between the absorption of the produced particle and the absorption of the incident particle. One still faces the problem of specifying the absorption parameters 7; and the coefficients e¿j. The coefficient 7; of the incident particle is, as a rule, easy because this is a well-known particle which can form a beam and its scattering (elastic) properties are known reasonably well. The trouble is with the outgoing objects; e.g., when 3 are produced in the →3 reaction: are then its n's given by the absorption of 37 in the target? In fact, one usually determines them experimentally (see the end of this section). So far as the e¡; are concerned, they are small-hence some perturbation theory can be used to compute them. We shall give some examples further in the text. How does one implement this program? There are strongly interacting particles which realize precisely the above outlined scheme and we even know d;;'s and 7,'s: the neutral K mesons. Because of the relation the partners of K+, Ko particles are K-, Ko antiparticles. Hence there are two different neutral K mesons which can be produced in the collision of strongly interacting particles: K° and K° (they are different because they have opposite strangeness, unlike pions where are identical to !) which have the same masses, and thus can be considered as a two component degenerate system. When left in empty space, however, both Ko and Ko, decay weakly with two different lifetimes as if they were made up of two different particles, which is indeed the case. These two particles are the following superpositions of | Ko) and | Ão) states |