A study on analytic parametrizations for proton-proton cross-sections and asymptotia

TL;DR

This study compares different analytic parametrizations for proton-proton and antiproton-proton cross-sections across a wide energy range, analyzing their fit quality and asymptotic behavior, with implications for understanding high-energy hadronic interactions.

Contribution

It introduces a comprehensive comparison of power-law and logarithmic models for high-energy cross-sections, including free and fixed scale parameters, and assesses their consistency with recent experimental data.

Findings

All models fit data up to 7 TeV within uncertainties.

Logarithmic models show dependence on energy scale assumptions.

Predicted asymptotic elastic-to-total cross-section ratio remains below 0.43.

Abstract

A comparative study on some representative parametrizations for the total and elastic cross-sections as a function of energy is presented. The dataset comprises pp and \bar{p}p scattering in the c.m energy interval 5 GeV-8 TeV. The parametrization for the total cross-section at low and intermediate energies follows the usual reggeonic structure (non-degenerate trajectories). For the leading high-energy pomeron contribution, we consider three distinct analytic parametrizations: either a power (P) law, or a log-squared (L2) law or a log-raised-to-gamma (Lgamma) law, where the exponent gamma is treated as a real free fit parameter. The parametrizations are also extended to fit the elastic (integrated) cross-section data in the same energy interval. Our main conclusions are the following: the data reductions with the logarithmic laws show strong dependence on the unknown energy scale involved, which is treated here either as a free parameter or fixed at the energy threshold; the fit results with the P law, the L2 law (free scale) and the Lgamma law (fixed scale and exponent gamma above 2) are all consistent within their uncertainties and with the experimental data up to 7 TeV, but they partially underestimate the high-precision TOTEM measurement at 8 TeV; once compared with these results, the L2 law with fixed scale is less consistent with the data and, in the case of a free scale, this pomeron contribution decreases as the energy increases below the scale factor (which lies above the energy cutoff); in all cases investigated, the predictions for the asymptotic ratio between the elastic and total cross-sections, within the uncertainties, do not exceed the value 0.430 (therefore, below the black-disc limit) and the results favor rational limits between 1/3 and 2/5. We are led to conclude that the rise of the hadronic cross-sections at the highest energies still constitutes an open problem.