ππ Scattering Amplitudes that Satisfy Inelastic Unitarity Constraints

We construct amplitudes which are represented by a Mandelstam representation with a finite number of subtractions and that satisfy ππ crossing symmetry and the unitarity constraints Im f_l^I(s) ≧|f_l^I (s)|², l=0, 1, 2,…, for all energies above threshold s > 4, in the three isospin channels I=0, 1, 2. The following types of solutions are derived.

• 1 The amplitudes have a positive double spectral function ϱ(s, t) ≧ 0. The total cross section decreases like σ_T(s) ∼ (log s)^-δ for arbitrary δ ≧ 1, including the limiting case δ=1.
• 2 The amplitudes are dominated by Regge poles, the total cross section can reach a constant asymptotic value, σ_T(s) → const.
• 3 The amplitudes are dominated by Regge cuts, the total cross section can increase logarithmically σ_T(s) → log s.