Dispersive analysis of the ππ and π K scattering data

Abstract

We present a data-driven analysis of the S-wave ππ ππ\,(I=0,2) and π K π K\,(I=1/2, 3/2) reactions using the partial-wave dispersion relation. The contributions from the left-hand cuts are parametrized using the expansion in a suitably constructed conformal variable, which accounts for its analytical structure. The partial-wave dispersion relation is solved numerically using the N/D method. The fits to the experimental data supplemented with the constraints from chiral perturbation theory at threshold and Adler zero give the results consistent with Roy-like (Roy-Steiner) analyses. For the ππ scattering we present the coupled-channel analysis by including additionally the KK channel. By the analytic continuation to the complex plane, we found poles associated with the lightest scalar resonances σ/f0(500), f0(980), and /K0*(700). For all the channels we also performed the fits directly to the Roy-like (Roy-Steiner) solutions in the physical region, in order to minimize the N/D uncertainties in the complex plane and to extract the most constrained Omn\`es functions.