Resummation approach in Fractional APT: How many loops do we need to calculate?

Abstract

We give a short introduction to the Analytic Perturbation Theory (APT) in QCD, discuss its problems and how they can be resolved in Fractional APT (FAPT), and give a brief report about taking into account heavy-quark thresholds in FAPT. Then we describe the resummation approach in the one-loop APT and FAPT, which produces finite answers in both Euclidean and Minkowski regions, provided the generating function P(t) of perturbative coefficients dn is known. We consider its applications in estimations of the width of Higgs boson decay H0 bb and of the Adler function D(Q2) and the ratio R(s) in the Nf=4 region. In order to provide numerical answers we suggest very simple factorially growing models for perturbative coefficients dn. We see that for the case of Higgs boson decay an accuracy of the order of 1% is reached at N3LO approximation, when term d3 A3 is taken into account. In the case of Adler function D(Q2) we have an accuracy of the order of 0.1% already at N2LO (i. e., with taking into account d2 A2 term). The main conclusion is: In order to achieve an accuracy of the order of 1%, we do not need to calculate more than four loops and d4 coefficients are needed only to estimate corresponding generating functions P(t).