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Version 6 (modified by jkaspar, 11 years ago) (diff)

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Model of Bourrely et al.

References

Used for implementation:

[1] BOURRELY C., SOFFER, J. and WU, T. T., Phys. Rev. D19 (1979) 3249
[2] BOURRELY C., SOFFER, J. and WU, T. T., Nucl. Phys. B247 (1984) 15
[3] BOURRELY C., SOFFER, J. and WU, T. T., Eur. Phys. J. C28 (2003) 97-105
[4] BOURRELY C., SOFFER, J. and WU, T. T., Eur. Phys. J. C71 (2011) 1601

Other sources:

[5] CHENG H. and WU, T. T., Phys. Rev. Lett. 24 (1970) 1456-1460

Implementation notes

Implemented in class BSWModel (see in Doxygen).

There have been several issues met during the model implementation.

  1. The function S0 defined by Eq. (3) in [3] is in fact also function of t (via the third Mandelstam variable u). Therefore - strictly speaking - S0 can not be used in Eq. (2) in [3], where the independent quantity is the impact parameter b. However, in the typical kinematics, s is much larger than |t| and thus one may very well approximate u by -s. In this approximation (used in Elegent), S0 becomes function of s only.
  2. Yet another problem related to S0. As u takes negative values, the powers uc and (ln u)c' become ambiguous. For instance, one may write u = |u| exp(i pi (2k_u - 1)), where k_u is an integer. Therefore ln u = ln |u| + i pi (2k_u - 1), which enters the power uc = exp(c ln u). Similarly for the power of the logarithm, one needs to calculate ln (ln u) = ... + i ( alpha + 2 k_lnu pi), where alpha = atan2(Im ln u, Re ln u) and k_lnu is an arbitrary integer. As it is demonstrated by this test sheet, only k_u = k_lnu = 0 reproduce the high energy behaviour of sigma_tot(s) and rho(s).
  3. The Regge background shall become negligible at high energies, however, looking in Table 3 in [3], all the trajectories have positive intercept and thus their impact will increase with energy. In publication [2], there is a footnote (with four stars on page 17) stating that a previous paper [1] contains a misprint: the opacity should have read Omega0 = i s S0 F0 + R0. This gives a more correct ratio of the pomeron to the Regge term, however the overall normalisation is wrong. Therefore we have "moved" the i s factor to the Regge term: Omega0 = S0 F0 - i/s R0. Besides this, we have tried also factors 1/s, -1/s and +i/s in front of the R0 term. But as shown in this test sheet, only the -i/s leads to reasonable description of the lower energy region.
  4. The signatures of the Regge trajectories are not specified in any publication. We have confirmed our guess A2: +, rho: - and omega: - by trying all combinations (see this test sheet).
  5. Below Eq. (7), the text instructs to sum the 3 Regge exchange amplitudes (tilda R0). Unfortunately, it does not mention the signs that are to be applied to each of the amplitudes, which are responsible for the difference between pp and app reactions. The signs for A2, rho and omega amplitudes read +, + and + for pp and +, - and - for app.

After these corrections, our calculations are in very good agreement with published predictions, see this test sheet.