English

Systematic Analysis of Flow Distributions

Nuclear Theory 2021-01-04 v2 High Energy Physics - Phenomenology Nuclear Experiment

Abstract

The information of the event-by-event fluctuations is extracted from flow harmonic distributions and cumulants, which can be done experimentally. In this work, we employ the standard method of Gram-Charlier series with the normal kernel to find such distribution, which is the generalization of recently introduced flow distributions for the studies of the event-by-event fluctuations. Also, we introduce a new set of cumulants jn{2k}j_n\{2k\} which have more information about the fluctuations compared with other known cumulants. The experimental data imply that not only all of the information about the event-by-event fluctuations of collision zone properties and different stages of the heavy-ion process are not encoded in the radial flow distribution p(vn)p(v_n), but also the observables describing harmonic flows can generally be given by the joint distribution P(v1,v2,...)\mathcal{P}(v_1,v_2,...). In such a way, we first introduce a set of joint cumulants Knm\mathcal{K}_{nm}, and then we find the flow joint distribution using these joint cumulants. Finally, we show that the Symmetric Cumulants SC(2,3)SC(2,3) and SC(2,4)SC(2,4) obtained from ALICE data are explained by the combinations K22+12K04K31\mathcal{K}_{22}+\frac{1}{2}\mathcal{K}_{04}-\mathcal{K}_{31} and K22+4K112\mathcal{K}_{22}+4\mathcal{K}_{11}^2.

Keywords

Cite

@article{arxiv.2006.16019,
  title  = {Systematic Analysis of Flow Distributions},
  author = {Hadi Mehrabpour},
  journal= {arXiv preprint arXiv:2006.16019},
  year   = {2021}
}

Comments

12 pages, 6 figures

R2 v1 2026-06-23T16:41:58.303Z