Analytic Perturbation Theory in analyzing some QCD observables
Abstract
The paper is devoted to application of recently devised ghost-free Analytic Perturbation Theory (APT) for analysis of some QCD observables. We start with the discussion of the main problem of the perturbative QCD -- ghost singularities and with the resume of this trouble solution within the APT. By a few examples in the various energy and momentum transfer regions (with the flavor number f=3, 4 and 5) we demonstrate the effect of improved convergence of the APT modified perturbative QCD expansion. Our first observation is that in the APT analysis the three-loop contribution αs3) is as a rule numerically inessential. This gives raise a hope for practical solution of the well-known problem of asymptotic nature of common QFT perturbation series. The second result is that a usual perturbative analysis of time-like events with the big π2 term in the αs3 coefficient is not adequate at s≤ 2 2. In particular, this relates to τ decay. Then, for the "high" (f=5) region it is shown that the common two-loop (NLO, NLLA) perturbation approximation widely used there (at 10 s 170 ) for analysis of shape/events data contains a systematic negative error of a 1--2 per cent level for the extracted alphas(2) values. Our physical conclusion is that the alphas(M2Z) value averaged over the f=5 data appreciably differs <baralphas(M2Z)>f=5 0.124 from the currently accepted "world average" (=0.118).
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