RG/Pade Estimate of the Three-Loop Contribution to the QCD Static Potential Function
Abstract
The three renormalization-group-accessible three-loop coefficients of powers of logarithms within the MS series momentum-space for the QCD static potential are calculated and compared to values obtained via asymptotic Pad\'e-approximant methods. The leading and next-to-leading logarithmic coefficients are both found to be in exact agreement with their asymptotic Pad\'e-predictions. The predicted value for the third RG-accessible coefficient is found to be within 7% relative |error| of its true value for nf leq 6, and is shown to be in exact agreement with its true value in the nf ∞ limit. Asymptotic Pad\'e estimates are also obtained for the remaining (RG-inaccessible) three-loop coefficient. Comparison is also made with recent estimates of the three-loop contribution to the configuration-space static-potential function.
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