Revisiting Roy-Steiner-equation analysis of pion-kaon scattering from lattice QCD data

Abstract

A comprehensive analysis of π K→ π K and ππ→ K K amplitudes at large unphysical pion mass for all important partial waves is presented. A set of crossing-symmetric partial-wave hyperbolic dispersion relations is used to describe lattice QCD data at mπ=391 MeV. In the present analysis, the amplitudes for the S- and P-waves are formulated by combining the constraints of analyticity, unitarity, and crossing symmetry, fulfilling Roy-Steiner-type equations. We use these results to investigate the low-lying strange-meson resonances and resolve the instability problem tied to analytic continuation in prior lattice QCD studies based on the K-matrix formalism. At mπ=391 MeV, the rigorous Roy-Steiner-type equation approach allows us to determine the S-wave scattering lengths, mπ a01/2=(0.92-0.28+0.06), mπ a03/2=-(0.32-0.02+0.05), and the (also known as K0*(700)) pole position, s=(966-24+41-i 198-17+38) MeV. We also provide a detailed analysis of the complex validity domain of the Roy-Steiner-type equations.