Charged kaon electric polarizability from four-point functions in lattice QCD

Abstract

We present a lattice QCD calculation of the electric polarizability of the charged kaon using a four-point function approach, which is the Euclidean analog of low-energy Compton scattering. In the case of the charged kaon, the polarizability is separated into an elastic (Born) term, determined from the charge radius extracted via the kaon electromagnetic form factor, and an inelastic (non-Born) term obtained from the time-integrated difference of four-point correlation functions. Our study employs 500 configurations of Wilson quenched 243× 48 lattices, and we compute connected diagrams as a proof of principle. From this analysis, we obtain values for the charged kaon electric polarizability of αE = (0.988 0.534) × 10-4\;fm3 as well as rE2 =0.3303 0.0028\;fm2 for the squared kaon charge radius, after extrapolation to the physical pion mass. The study demonstrates the applicability of the four-point function framework to strange mesons, extends previous four-point function polarizability studies, and provides a foundation for future calculations with increased statistics, dynamical fermions, and improved control of systematic uncertainties.