Towards asymptotic completeness of two-particle scattering in local relativistic QFT

Abstract

We consider the problem of existence of asymptotic observables in local relativistic theories of massive particles. Let p1 and p2 be two energy-momentum vectors of a massive particle and let be a small neighbourhood of p1+ p2. We construct asymptotic observables (two-particle Araki-Haag detectors), sensitive to neutral particles of energy-momenta in small neighbourhoods of p1 and p2. We show that these asymptotic observables exist, as strong limits of their approximating sequences, on all physical states from the spectral subspace of . Moreover, the linear span of the ranges of all such asymptotic observables coincides with the subspace of two-particle Haag-Ruelle scattering states with total energy-momenta in . The result holds under very general conditions which are satisfied, for example, in φ42. The proof of convergence relies on a variant of the phase-space propagation estimate of Graf.