English

Log-enhanced discretization errors in integrated correlation functions

High Energy Physics - Lattice 2022-11-30 v1 High Energy Physics - Phenomenology

Abstract

Integrated time-slice correlation functions G(t)G(t) with weights K(t)K(t) appear, e.g., in the moments method to determine αs\alpha_s from heavy quark correlators, in the muon g-2 determination or in the determination of smoothed spectral functions. For the (leading-order-)normalised moment R4R_4 of the pseudo-scalar correlator we have non-perturbative results down to a=102a=10^{-2} fm and for masses, mm, of the order of the charm mass in the quenched approximation. A significant bending of R4R_4 as a function of a2a^2 is observed at small lattice spacings. Starting from the Symanzik expansion of the integrand we derive the asymptotic convergence of the integral at small lattice spacing in the free theory and prove that the short distance part of the integral leads to log(a)\log(a)-enhanced discretisation errors when G(t)K(t)tG(t)K(t) \sim\, t for small tt. In the interacting theory an unknown, function K(aΛ)K(a\Lambda) appears. For the R4R_4-case, we modify the observable to improve the short distance behavior and demonstrate that it results in a very smooth continuum limit. The strong coupling and the Λ\Lambda-parameter can then be extracted. In general, and in particular for g2g-2, the short distance part of the integral should be determined by perturbation theory. The (dominating) rest can then be obtained by the controlled continuum limit of the lattice computation.

Keywords

Cite

@article{arxiv.2211.15750,
  title  = {Log-enhanced discretization errors in integrated correlation functions},
  author = {Leonardo Chimirri and Nikolai Husung and Rainer Sommer},
  journal= {arXiv preprint arXiv:2211.15750},
  year   = {2022}
}
R2 v1 2026-06-28T07:15:45.106Z