Renormalon subtraction in OPE using Fourier transform: Formulation and application to various observables (2106.03687v2)

Abstract: Properly separating and subtracting renormalons in the framework of the operator product expansion (OPE) is a way to realize high precision computation of QCD effects in high energy physics. We propose a new method (FTRS method), which enables to subtract multiple renormalons simultaneously from a general observable. It utilizes a property of Fourier transform, and the leading Wilson coefficient is written in a one-parameter integral form whose integrand has suppressed (or vanishing) renormalons. The renormalon subtraction scheme coincides with the usual principal-value prescription at large orders. We perform test analyses and subtract the ${\cal O}(\Lambda_{\rm QCD}^4)$ renormalon from the Adler function, the ${\cal O}(\Lambda_{\rm QCD}^2)$ renormalon from the $B\to X_ul\bar{\nu}$ decay width, and the ${\cal O}(\Lambda_{\rm QCD})$ and ${\cal O}(\Lambda_{\rm QCD}^2)$ renormalons from the $B,\,D$ meson masses. The analyses show good consistency with theoretical expectations, such as improved convergence and scale dependence. In particular we obtain $\bar{\Lambda}{\rm FTRS}=0.495\pm0.053~\text{GeV}$ and$ (\mu\pi^2)_{\rm FTRS}=-0.12\pm 0.23~\text{GeV}^2$ for the non-perturbative parameters of HQET. We explain the formulation and analyses in detail.