Constraint on the light quark mass mq from QCD Sum Rules in the I=0 scalar channel

Abstract

In this paper, we reanalyze the I=0 scalar channel with the improved Monte-Carlo based QCD sum rules, which combines the rigorous H\"older-inequality-determined sum rule window and a two Breit-Wigner type resonances parametrization for the phenomenological spectral density that satisfies the the low-energy theorem for the scalar form factor. Considering the uncertainties of the QCD parameters and the experimental masses and widths of the scalar resonances σ and f0(980), we obtain a prediction for light quark mass mq(2\,GeV) = 12(mu(2\,GeV) + md(2\,GeV)) = 4.7+0.8-0.7\,MeV, which is consistent with the PDG (Particle Data Group) value and QCD sum rule determinations in the pseudoscalar channel. This agreement provides a consistent framework connecting QCD sum rules and low-energy hadronic physics. We also obtain the decay constants of σ and f0(980) at 2 GeV, which are approximately 0.64-0.83 GeV and 0.40-0.48 GeV respectively.