Estimates of the higher-order QCD corrections: Theory and Applications
Abstract
We consider the further development of the formalism of the estimates of higher-order perturbative corrections in the Euclidean region, which is based on the application of the scheme-invariant methods, namely the principle of minimal sensitivity and the effective charges approach. We present the estimates of the order O(α4s) QCD corrections to the Euclidean quantities: the e+e--annihilation D-function and the deep inelastic scattering sum rules, namely the non-polarized and polarized Bjorken sum rules and to the Gross--Llewellyn Smith sum rule. The results for the D-function are further applied to estimate the O(αs4) QCD corrections to the Minkowskian quantities R(s) = σtot (e+e- hadrons) / σ (e+e- μ+ μ-) and Rτ = (τ τ + hadrons) / (τ τ e e). The problem of the fixation of the uncertainties due to the O(αs5) corrections to the considered quantities is also discussed.
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