We further develop the approach recently used to construct an analytic ghost-free model for the QCD running coupling based on the requirement of the $Q^2$-analyticity and apply it to the process of $e^+e^-$ annihilation into hadrons to study the renormalization scheme dependence of the $R(s)$ cross-section ratio. \par By transforming the relevant QCD corrections up to the three-loop level into the "analytized" form we show that the $R_{AA}(s)$ expression thus obtained is remarkably stable (as compared to the conventional perturbative approach) with respect to the renormalization scheme dependence for the whole low-energy region
Previously developed Pade-related method of resummation for QCD observables, which achieves exact re...
The problem of improving the reliability of perturbative QCD predictions at moderate energies is con...
Commensurate scale relations relate observables to observables and thus are independent of theoretic...
The renormalization group method enables one to improve the properties of the QCD perturbative power...
The model for the QCD analytic running coupling, proposed recently, is extended to the timelike regi...
Technical aspects of the Shirkov--Solovtsov's analytic perturbation theory (APT) are considered. We ...
We present skeleton-motivated evaluation of QCD observables. The approach can be applied in analytic...
An analytic ghost-free model for the QCD running coupling a(Q(^2)) is proposed. It is constructed fr...
The properties of the new analytic running coupling are investigated at the higher loop levels. The ...
As is known from QED, a possible solution to the ghost-pole trouble can be obtained by imposing the ...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Recently, we have developed a new formalism to evaluate QCD loop diagrams with a single virtual gluo...
AbstractThe QCD running coupling αs(Q2) sets the strength of the interactions of quarks and gluons a...
We present a detailed investigation of the renormalization scheme dependence of the next-to-next-to-...
The mathematical properties of the new analytic running coupling (NARC) in QCD are investigated. Thi...
Previously developed Pade-related method of resummation for QCD observables, which achieves exact re...
The problem of improving the reliability of perturbative QCD predictions at moderate energies is con...
Commensurate scale relations relate observables to observables and thus are independent of theoretic...
The renormalization group method enables one to improve the properties of the QCD perturbative power...
The model for the QCD analytic running coupling, proposed recently, is extended to the timelike regi...
Technical aspects of the Shirkov--Solovtsov's analytic perturbation theory (APT) are considered. We ...
We present skeleton-motivated evaluation of QCD observables. The approach can be applied in analytic...
An analytic ghost-free model for the QCD running coupling a(Q(^2)) is proposed. It is constructed fr...
The properties of the new analytic running coupling are investigated at the higher loop levels. The ...
As is known from QED, a possible solution to the ghost-pole trouble can be obtained by imposing the ...
A pattern of partial resummation of perturbation theory series inspired by analytical continuation i...
Recently, we have developed a new formalism to evaluate QCD loop diagrams with a single virtual gluo...
AbstractThe QCD running coupling αs(Q2) sets the strength of the interactions of quarks and gluons a...
We present a detailed investigation of the renormalization scheme dependence of the next-to-next-to-...
The mathematical properties of the new analytic running coupling (NARC) in QCD are investigated. Thi...
Previously developed Pade-related method of resummation for QCD observables, which achieves exact re...
The problem of improving the reliability of perturbative QCD predictions at moderate energies is con...
Commensurate scale relations relate observables to observables and thus are independent of theoretic...