English

The LPM effect in sequential bremsstrahlung

High Energy Physics - Phenomenology 2016-10-20 v6 Nuclear Theory

Abstract

The splitting processes of bremsstrahlung and pair production in a medium are coherent over large distances in the very high energy limit, which leads to a suppression known as the Landau-Pomeranchuk-Migdal (LPM) effect. We analyze the case when the coherence lengths of two consecutive splitting processes overlap, which is important for understanding corrections to standard treatments of the LPM effect in QCD. Previous authors have analyzed this problem in the case of overlapping double bremsstrahlung where at least one of the bremsstrahlung gluons is soft. Here we show how to generalize to include the case where both splittings are hard. A number of techniques must be developed, and so in this paper we simplify by (i) restricting attention to a subset of the interference effects, which we call the "crossed" diagrams, and (ii) working in the large-NcN_c limit. We first develop some general formulas that could in principle be implemented numerically (with substantial difficulty). To make more analytic progress, we then focus on the case of a thick, homogeneous medium and make the multiple scattering approximation (also known as the q^\hat q or harmonic approximation) appropriate at high energy. We show that the differential rate dΓ/dxdyd\Gamma/dx\,dy for overlapping double bremsstrahlung of gluons with momentum fractions xx and yy can then be reduced to the calculation of a 1-dimensional integral, which we perform numerically. [Though this paper is unfortunately long, our introduction is enough for getting the gist of the method.]

Keywords

Cite

@article{arxiv.1501.04964,
  title  = {The LPM effect in sequential bremsstrahlung},
  author = {Peter Arnold and Shahin Iqbal},
  journal= {arXiv preprint arXiv:1501.04964},
  year   = {2016}
}

Comments

85 pages, 30 figures [only change from v5: fixed trivial typo of a missing bar in eq. (2.20a). The authors are obsessive.]

R2 v1 2026-06-22T08:07:40.442Z