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The Role of the $Δ(1920)$ Resonance for Kaon Production in Heavy Ion Collisions

arXiv:nucl-th/9407021 · doi:10.1016/0370-2693(94)90971-7

Abstract

The long mean free path of $K^+$ mesons in nuclear matter makes this particle a suitable messenger for the dynamics of nucleus-nucleus reactions at intermediate energies (100 MeV to 3 GeV per nucleon). A prerequisite for this is the knowledge of the elementary production cross sections $πN \rightarrow ΣK$. Here these cross sections are studied for the first time with the explicite inclusion of the relevant baryon resonances up to 2 GeV as intermediate states. The baryon resonances -- $N(1710)\, I(J^P) = \frac{1}{2} (\frac{1}{2}^+),\, N(1720)\, \frac{1}{2} (\frac{3}{2}^+)$ and $Δ(1920)\, \frac{3}{2} (\frac{3}{2}^+)\,$ -- are taken into account coherently in the calculations of the $πN \rightarrow ΣK$ process. (We refer to this model as the `resonance model'.) Also $K^*(892)\frac{1}{2} (1^-)$ vector meson exchange is included. It is shown that the total cross sections for different channels of the $πN \rightarrow Σk$ reactions, i.e. $π^+ p \rightarrow Σ^+ K^+$, $π^- p \rightarrow Σ^- K^+$, $π^+ n \rightarrow Σ^0 K^+$ ($π^- p \rightarrow Σ^- K^+$) and $π^0 p \rightarrow Σ^0 K^+$ differ not only by absolute values but also by their energy dependence. This shape differences are due to the mixture of the isospin $I = 3/2$ $Δ(1920)$ with isospin $I = 1/2$ nucleon resonances. However, this $I = 3/2$ resonance does not give a contribution to the $πN \rightarrow ΛK$ reactions. So the shapes of the total cross sections $πN \rightarrow ΛK$ for different isospin projections are the same. In spite of this, such cross sections averaged over different isospin projections in the same multiplet

( Replaced with corrections of printing errors in the Table. ) 18 pages, Latex file with 6 figures, 2 figures are included in the text. A compressed uuencode file for 4 figures is appended. Also available upon request