Soft-photon theorem for pion-proton elastic scattering revisited

Abstract

We discuss the reactions π p π p and π p π p γ from a general quantum field theory (QFT) point of view, describing these reactions in QCD and lowest relevant order of electromagnetism. We consider the pion-proton elastic scattering both off shell and on shell. The on-shell amplitudes for π p π p scattering are described by two invariant amplitudes, while the off-shell amplitudes contain eight invariant amplitudes. We study the photon emission amplitudes in the soft-photon limit where the c.m. photon energy ω 0. The Laurent expansion in ω of the π p π p γ amplitudes is considered and the terms of the orders ω-1 and ω0 are derived. These terms can be expressed by the on-shell invariant amplitudes and their partial derivatives with respect to s and t. The pole term ω-1 in the amplitudes corresponds to Weinberg's soft-photon theorem and is well known from the literature. We derive the next-to-leading term ω0 using only rigorous methods of QFT. We give the relation of the Laurent series for π0 p π0 p γ and Low's soft-photon theorem. Our formulas for the amplitudes in the limit ω 0 are valid for photon momentum k satisfying k2 ≥slant 0, k0 = ω ≥slant 0, that is, for both real and virtual photons. Here we consider a limit where with ω 0 we have also k2 0. We discuss the behavior of the corresponding cross-sections for π- p π- p γ with respect to ω for ω 0. We consider cross sections for unpolarized as well as polarized protons in the initial and final states.