The heavy quarkonium inclusive decays using the principle of maximum conformality

Abstract

The next-to-next-to-leading order (NNLO) pQCD correction to the inclusive decays of the heavy quarkonium ηQ (Q being c or b) has been done in the literature within the framework of nonrelativistic QCD. One may observe that the NNLO decay width still has large conventional renormalization scale dependence due to its weaker pQCD convergence, e.g. about (+4\%-34\%) for ηc and (+0.0-9\%) for ηb, by varying the scale within the range of [mQ, 4mQ]. The principle of maximum conformality (PMC) provides a systematic way to fix the αs-running behavior of the process, which satisfies the requirements of renormalization group invariance and eliminates the conventional renormalization scheme and scale ambiguities. Using the PMC single-scale method, we show that the resultant PMC conformal series is renormalization scale independent, and the precision of the ηQ inclusive decay width can be greatly improved. Taking the relativistic correction O(αsv2) into consideration, the ratios of the ηQ decays to light hadrons or γγ are: R NNLOηc|PMC=(3.93+0.26-0.24)×103 and R NNLOηb|PMC=(22.85+0.90-0.87)×103, respectively. Here the errors are for αs(MZ) = 0.0011. As a step forward, by applying the Pade approximation approach (PAA) over the PMC conformal series, we obtain approximate NNNLO predictions for those two ratios, e.g. R NNNLOηc|PAA+PMC =(5.66+0.65-0.55)×103 and R NNNLOηb|PAA+PMC=(26.02+1.24-1.17)×103. The R NNNLOηc|PAA+PMC ratio agrees with the latest PDG value Rηcexp=(5.3-1.4+2.4)×103, indicating the necessity of a strict calculation of NNNLO terms.