L\'evy α-stable model for the non-exponential low-|t| proton-proton differential cross section

Abstract

It is known that the Real Extended Bialas-Bzdak (ReBB) model describes the proton-proton (pp) and proton-antiproton (p p) differential cross-section data in a statistically non-excludible way, i.e., with a confidence level greater than or equal to 0.1\% in the center of mass energy range 546 GeV ≤s≤ 8 TeV and in the squared four-momentum transfer range 0.37 GeV2 ≤ -t≤ 1.2 GeV2. Considering, instead of Gaussian, a more general L\'evy α-stable shape for the parton distributions of the constituent quark and diquark inside the proton and for the relative separation between them, a generalized description of data is obtained, where the ReBB model corresponds to the α = 2 special case. Extending the model to α < 2, we conjecture that the validity of the model can be extended to a wider kinematic range, in particular, to lower values of the four-momentum transfer -t. We present the formal L\'evy α-stable generalization of the Bialas-Bzdak model and show that a simplified version of this model can be successfully fitted, with α< 2, to the non-exponential, low -t differential cross-section data of elastic proton-proton scattering at s = 8 TeV.