Pomeron pole plus grey disk model: real parts, inelastic cross sections and LHC data

Abstract

I propose a two component analytic formula F(s,t)=F(1)(s,t)+F(2)(s,t) for (ab→ ab) +(ab→ ab) scattering at energies 100 GeV ,where s,t denote squares of c.m. energy and momentum transfer.It saturates the Froissart-Martin bound and obeys Auberson-Kinoshita-Martin (AKM) AKM1971 scaling. I choose Im F(1)(s,0)+Im F(2)(s,0) as given by Particle Data Group (PDG) fits to total cross sections. The PDG formula is extended to non-zero momentum transfers using partial waves of Im F(1) and Im F(2) motivated by Pomeron pole and 'grey disk' amplitudes . Re F(s,t) is deduced from real analyticity: I prove that Re F(s,t)/ImF(s,0) → (π/s) d/dτ (τ Im F(s,t)/ImF(s,0) ) for s→ ∞ with τ=t (ln s)2 fixed, and apply it to F(2).Using also the forward slope fit by Schegelsky-Ryskin , the model gives real parts,differential cross sections for (-t)<.3 GeV2, and inelastic cross sections in good agreement with data at 546 GeV, 1.8 TeV,7 TeV and 8 TeV . It predicts for inelastic cross sections for pp or p p, σinel=72.7 1.0 mb at 7TeV and 74.2 1.0mb at 8 TeV in agreement with pp Totem experimental values 73.1 1.3 mb and 74.7 1.7 mb respectively, and with Atlas values 71.3 0.9 mb and 71.7 0.7mb respectively. The predictions at 546 GeV and 1800 GeV also agree with p p experimental results of Abe et al Abe at 546 GeV and 1800 GeV. The model yields for s> 0.5 TeV, with PDG2013 total cross sections , and Schegelsky-Ryskin slopes as input, σinel (s) =22.6 + .034 ln s + .158 (ln s)2 mb , and σinel / σtot → 0.56, s→ ∞ , where s is in GeV2